Influence of Soil Gradation, Moisture Content, and Density on Thermal Resistivity of Soils for Buried Cable Applications

preprint OA: closed CC-BY-4.0
📄 Open PDF Full text JSON View at publisher

Abstract

Abstract The thermal resistivity of sand backfills significantly affects buried power transmission cables’ performance and longevity. This study examines thermal resistivity of poorly graded (SP) and well-graded (SW) sands under varying relative density, moisture content, and atmospheric exposure. Laboratory tests used the Transient Line Source method on sand samples at 20%, 50%, and 80% relative density with 0%–8% moisture content. Samples with 8%, 4%, and 2% initial moisture were exposed to atmospheric conditions for up to 24 hours to assess moisture loss effects. Results show thermal resistivity decreases significantly with higher moisture content and density, with SW sand exhibiting 10–15% lower resistivity than SP sand due to better particle packing. At 8% moisture, resistivity ranged from 0.489–0.640 m.K/W for SP sand and 0.389–0.543 m.K/W for SW sand. Atmospheric exposure increased resistivity by 123–158% over 24 hours, especially at high initial moisture. A multilinear regression model incorporating sand type, moisture, density, and exposure time achieved high accuracy (R² = 0.97, RMSE = 0.089 m.K/W). These findings offer valuable insights for optimizing sand backfill selection and design, enhancing thermal management and cable ampacity in underground installations.
Full text 763,738 characters · extracted from preprint-html · click to expand
Influence of Soil Gradation, Moisture Content, and Density on Thermal Resistivity of Soils for Buried Cable Applications | Research Square window.SnipcartSettings = { analytics: { enabled: false } }; (function() { var accessVector = localStorage.getItem('access_vector') || ''; window.dataLayer = window.dataLayer || []; if (accessVector) { window.dataLayer.push({ user: { profile: { profileInfo: { snid: accessVector } } } }); } })(); (function(w,d,s,l,i){w[l]=w[l]||[];w[l].push({'gtm.start':new Date().getTime(),event:'gtm.js'});var f=d.getElementsByTagName(s)[0],j=d.createElement(s),dl=l!='dataLayer'?'&l='+l:'';j.async=true;j.src='https://www.googletagmanager.com/gtm.js?id='+i+dl;f.parentNode.insertBefore(j,f);})(window,document,'script','dataLayer','GTM-K279D39R'); Browse Preprints In Review Journals COVID-19 Preprints AJE Video Bytes Research Tools Research Promotion AJE Professional Editing AJE Rubriq About Preprint Platform In Review Editorial Policies Our Team Advisory Board Help Center Sign In Submit a Preprint Cite Share Download PDF Research Article Influence of Soil Gradation, Moisture Content, and Density on Thermal Resistivity of Soils for Buried Cable Applications Vijayakumar Anbalagan, Umanath Umaiyan, Nadeem Gul, Govindaraj V, and 1 more This is a preprint; it has not been peer reviewed by a journal. https://doi.org/ 10.21203/rs.3.rs-7877492/v1 This work is licensed under a CC BY 4.0 License Status: Posted Version 1 posted You are reading this latest preprint version Abstract The thermal resistivity of sand backfills significantly affects buried power transmission cables’ performance and longevity. This study examines thermal resistivity of poorly graded (SP) and well-graded (SW) sands under varying relative density, moisture content, and atmospheric exposure. Laboratory tests used the Transient Line Source method on sand samples at 20%, 50%, and 80% relative density with 0%–8% moisture content. Samples with 8%, 4%, and 2% initial moisture were exposed to atmospheric conditions for up to 24 hours to assess moisture loss effects. Results show thermal resistivity decreases significantly with higher moisture content and density, with SW sand exhibiting 10–15% lower resistivity than SP sand due to better particle packing. At 8% moisture, resistivity ranged from 0.489–0.640 m.K/W for SP sand and 0.389–0.543 m.K/W for SW sand. Atmospheric exposure increased resistivity by 123–158% over 24 hours, especially at high initial moisture. A multilinear regression model incorporating sand type, moisture, density, and exposure time achieved high accuracy (R² = 0.97, RMSE = 0.089 m.K/W). These findings offer valuable insights for optimizing sand backfill selection and design, enhancing thermal management and cable ampacity in underground installations. Thermal resistivity Sand backfill Buried cables Moisture content Atmospheric exposure Regression modelling Figures Figure 1 Figure 2 Figure 3 Figure 4 Figure 5 Figure 6 Figure 7 Figure 8 Figure 9 Figure 10 Figure 11 1. INTRODUCTION In the rapidly evolving landscape of power distribution and underground utility systems, the thermal performance of cable trench backfill materials has become a critical factor in ensuring the operational efficiency and longevity of buried power cables. Among the various parameters influencing cable performance, the thermal resistivity of the surrounding soil, a measure of its resistance to heat flow, plays a pivotal role [ 1 – 2 ]. When electrical power flows through underground cables, it inevitably generates heat. This heat must be effectively dissipated into the surrounding soil to prevent thermal overloading. If the thermal resistivity of the backfill is underestimated or improperly accounted for, the heat generated cannot escape efficiently [ 3 – 5 ]. As a result, cable temperatures may rise beyond safe operational limits, potentially leading to premature insulation failure, reduced current-carrying capacity (ampacity), and, in extreme cases, complete cable burnout [ 6 ]. Such failures are costly to repair and can lead to significant service interruptions and safety hazards. To mitigate these risks, engineers often rely on thermal resistivity measurements of soil to design appropriate cable trench environments, particularly by selecting or engineering suitable backfill materials. Despite its importance, the thermal resistivity of soil is not a fixed property. In contrast, it is significantly influenced by several factors, notably soil density, gradation of sand (well-graded vs. poorly graded), and moisture content [ 7 – 9 ]. [ 9 ] conducted laboratory studies on various Jordanian soils and found that thermal conductivity increased with soil density and moisture content. Depending on these factors, sandy soils’ thermal conductivity ranged from 0.58 to 1.94 W/m·K. Similarly, [ 10 ] observed that thermal conductivity increased rapidly with moisture content up to a certain threshold (~ 27%), beyond which the rate of increase diminished. This behaviour is attributed to the formation of water films and bridges between soil particles, enhancing heat transfer. These factors influence the thermal pathways within the soil by modifying particle-to-particle contact, altering the proportion and distribution of air voids, and affecting the continuity of moisture films, all of which are critical determinants of thermal resistance. While previous studies have explored the effects of moisture and density on soil thermal resistivity, few researchers have studied the combined effect of parameters [ 11 ]. Still, there remains a noticeable research gap in systematically investigating the combined effect of sand gradation, compaction (Density), and moisture content, particularly in sandy backfill materials, which are commonly used due to their workability and drainage characteristics. This study aims to address this gap by experimentally examining the thermal resistivity behaviour of sands under varying gradation profiles, dry densities, and moisture contents. The study further examines how the rate at which moisture content decreases during drying impacts the thermal resistivity behaviour of the soil. The results are expected to contribute to the scientific understanding of soil thermal behaviour and provide practical guidance for engineers in selecting and designing backfill materials with optimal thermal performance for underground power cable installations. 2. MATERIALS USED Two types of sand with distinct gradation characteristics were selected and procured for the experimental study to investigate the effect on soil thermal resistivity. The selected sand samples were characterised in accordance with Indian Standards to determine their fundamental geotechnical properties, including particle size distribution, maximum and minimum dry densities, and angle of internal friction. The gradation curves of both samples are shown in Fig. 1 . The grain size analysis indicates that Sample 1 is classified as poorly graded sand (SP), while Sample 2 is classified as well-graded sand (SW). The additional properties of the samples are provided in Table 1 . Table 1 Properties of the Soil Samples Properties Sample 1 Sample 2 Coefficient of Uniformity (Cu) 4 9 Coefficient of Curvature (Cc) 1 1.5 Soil Classification SP SW Maximum density (g/cc) 1.708 1.820 Minimum density (g/cc) 1.424 1.55 The angle of Internal Friction (ɸ) 34 38 2.1 Thermal Resistivity Test Thermal conductivity of the specimens was measured using the TLS-100 Portable Thermal Conductivity Meter (Fig. 2 ) (Thermtest Inc., Canada), based on the Transient Line Source (TLS) method. The instrument employs a needle probe containing both a heating element and a temperature sensor, inserted directly into the sample. A known heat pulse is applied, and the resulting temperature rise is recorded over time. Thermal conductivity is determined by fitting the temperature-time response to the theoretical model of transient heat conduction. The TLS-100 is capable of measuring a wide range of materials, including soils, pastes, powders, and solids, with a typical accuracy of ± 5%. Its portability and ease of operation make it particularly suitable for both laboratory and field applications. 3. EXPERIMENTAL PROGRAMME The experimental study was designed to systematically investigate the thermal resistivity behaviour of granular soils under varying conditions of density, moisture content, and atmospheric exposure time. Two types of sand were selected based on their gradation characteristics: poorly graded sand (SP) and well-graded sand (SW). Initially, both soil types were tested in their dry state under three distinct compaction levels, dense, medium dense, and loose, to evaluate the influence of relative density on thermal resistivity. Subsequently, each gradation type and density condition was tested after the controlled addition of 2%, 4%, 6%, and 8% water content by dry weight to assess the effect of moisture content. Following this, the specimens at all three density levels were prepared with 8% water content, sealed, and then exposed to ambient atmospheric conditions (38–40°C). Thermal resistivity measurements were taken at 2 hours, 4 hours, 8 hours, and 24 hours post-exposure to evaluate the influence of time-dependent moisture loss and environmental temperature on thermal behaviour. Moisture content was also recorded at each time interval to correlate with changes in resistivity. This step-wise and parameter-isolated approach provided a robust dataset for understanding thermal resistivity response under varied field-simulated conditions. The detailed test matrix is shown in Table 2 . Table 2 Test Matrix of the Experimental Programme Phase Objective Soil Type Density Condition Moisture Content (%) Exposure Time (hrs) Thermal Resistivity Measured Moisture Content Monitored Phase 1 Effect of Dry Density SP, SW Dense, Medium, Loose 0 (Dry) - ✓ X Phase 2 Effect of Moisture Content SP, SW Dense, Medium, Loose 2, 4, 6, 8 - ✓ X Phase 3 Effect of Atmospheric Exposure (drying) SP, SW Dense, Medium, Loose 8 (initially) 2, 4, 8, 24 ✓ ✓ 4. RESULTS AND DISCUSSION The experimental investigations were carried out in a controlled laboratory environment, in strict accordance with the operational protocols outlined in the equipment manuals to ensure consistency and reliability. The data acquired from the tests underwent rigorous analysis, carefully considering potential variabilities. The findings are critically interpreted and systematically discussed in the following sections. 4.1 Effect of Density As outlined in the previous section, both soil types were compacted at different relative densities within a 1000 ml capacity mould. Subsequently, thermal resistivity tests were conducted on each prepared specimen. Figure 3 depicts the testing of thermal resistance using the TLS-100 Portable Thermal Conductivity Meter in the compacted soil. The results are analysed and drawn in a graph as presented in Fig. 4 . Thermal resistivity in well-graded sand found to be lower than in poorly graded sand, regardless of relative density, due to its superior particle size distribution and packing efficiency. Well-graded sand, characterised by a diverse range of particle sizes, enables smaller particles to fill voids between larger ones, enhancing inter-particle contacts and creating efficient heat transfer pathways [ 12 ]. This dense packing reduces air-filled voids, which exhibit high thermal resistivity, thereby improving thermal conduction [ 13 ]. Conversely, poorly graded sand, with its uniform particle sizes, forms a less compact structure with larger voids, limiting contact points and hindering heat flow [ 14 ]. Even at comparable relative densities, the broader gradation in well-graded sand ensures a more interconnected particle network, consistently resulting in lower thermal resistivity compared to the less efficient structure of poorly graded sand. 4.2 Effect of Moisture Content To investigate the influence of moisture content on the thermal resistivity of soil, experiments were conducted using both poorly graded and well-graded sands. Each sand type was prepared with varying moisture contents of 2%, 4%, 6%, and 8% by weight relative to its dry mass. The soil samples were also compacted to different relative density levels to assess the combined effects of moisture and density on thermal resistivity. This systematic approach enabled a comprehensive evaluation of how moisture content interacts with soil gradation and packing characteristics to influence thermal conduction properties. The testing system is presented in Fig. 5 . Thermal resistivity measurements were obtained for poorly graded and well-graded sands using specialised laboratory equipment to evaluate the effect of moisture content on the thermal resistivity of soil. Each sand type was tested at moisture contents of 2%, 4%, 6%, and 8% by weight relative to its dry mass, with samples prepared at varying relative density levels to assess the interplay of moisture and packing characteristics. Thermal resistivity values were recorded in triplicate for each combination of moisture content and relative density, and the results were averaged to ensure reliability and minimise experimental error (Farouki, 1986). The averaged data were analysed to compare the thermal resistivity trends between poorly graded and well-graded sands across the tested conditions. Figures 6 and 7 graphically illustrate the relationships among moisture content, relative density, and thermal resistivity for poorly graded (SP) and well-graded (SW) sands. These figures highlight the effects of soil gradation and moisture content on thermal conduction properties. Corresponding thermal resistivity values for SP and SW sands, as functions of varying moisture content, are presented in Tables 3 and 4 , respectively. Table 3 Variation in Thermal Resistivity due to Moisture Content in SP Soil Relative density (%) 20 Moisture Content (%) 0 2 4 6 8 Thermal resistivity (m.K/W) 4.401 2.52 1.646 1.069 0.640 Relative density (%) 50 Moisture Content (%) 0 2 4 6 8 Thermal resistivity (m.K/W) 3.580 2.190 1.340 0.820 0.501 Relative density (%) 80 Moisture Content (%) 0 2 4 6 8 Thermal resistivity (m.K/W) 3.420 1.954 1.274 0.824 0.489 Table 4 Variation in Thermal Resistivity due to Moisture Content in SW Soil Relative density (%) 20 Moisture Content (%) 0 2 4 6 8 Thermal resistivity (m.K/W) 4.100 2.125 1.394 0.912 0.543 Relative density (%) 50 Moisture Content (%) 0 2 4 6 8 Thermal resistivity (m.K/W) 3.220 1.864 1.210 0.795 0.455 Relative density (%) 80 Moisture Content (%) 0 2 4 6 8 Thermal resistivity (m.K/W) 3.010 1.659 1.084 0.698 0.389 The thermal resistivity of poorly graded (SP) and well-graded (SW) sands decreases significantly with increasing moisture content, as observed across relative densities levels of 20%, 50%, and 80%. For SP sand, thermal resistivity drops from 4.401 m.K/W at 0% moisture to 0.640 m.K/W at 8% moisture for a relative density of 20%, with similar trends at higher density levels (Tables 3 and 4 ). For SW sand, the values are consistently lower, ranging from 3.732 m.K/W at 0% moisture to 0.543 m.K/W at 8% moisture for the same density, reflecting a reduction of approximately 15% compared to SP sand. This reduction is attributed to the enhanced particle packing in SW sand, which minimises air voids and facilitates thermal conduction. The combined effect of density and moisture content is pronounced: at higher densities (80%) and moisture content (8%), SW sand exhibits a thermal resistivity of 0.417 m.K/W, compared to 0.489 m.K/W for SP sand, indicating that increased density amplifies the moisture-induced reduction in thermal resistivity by improving inter-particle contacts and reducing insulating air gaps. These trends underscore the critical interplay between soil gradation, density, and moisture in optimising thermal performance for applications such as underground cable systems. 4.3 Effect of Atmospheric Exposure To investigate the influence of atmospheric exposure on the thermal resistivity of sands, a series of tests was conducted on poorly graded (SP) and well-graded (SW) sands prepared at relative density levels of 20%, 50%, and 80%, with a range of moisture contents of 8%, 4% and 2%. The samples were exposed to natural sunlight for durations of 2, 4, 8, and 24 hours to simulate environmental conditions (Fig. 8 ) that may alter soil properties, such as moisture loss or surface compaction, thereby affecting thermal conduction. This study is critical for applications like underground cable systems, where prolonged exposure to atmospheric conditions can impact heat dissipation efficiency. Tables 5 and 6 present the values of varying thermal resistivity, and Figs. 9 and 10 represent the graphical representation of thermal resistivity variation based on atmospheric exposure of SP and SW sands. Table 5 Variation in Thermal Resistivity due to Atmospheric Exposure in SP Soil Thermal resistivity (m.K/W) Exposure 8% Moisture Content 4% Moisture Content 2% Moisture Content Time (hr) 20% Dense 50% Dense 80% Dense 20% Dense 50% Dense 80% Dense 20% Dense 50% Dense 80% Dense 0 0.64 0.501 0.489 1.11 0.982 0.935 2.245 2.07 1.960 2 0.922 0.791 0.736 1.524 1.278 1.189 2.345 2.154 2.035 4 1.141 1.002 0.922 1.775 1.458 1.343 2.416 2.217 2.083 8 1.463 1.311 1.193 2.02 1.632 1.493 2.503 2.289 2.136 24 1.43 1.291 1.162 2.16 1.732 1.579 2.6 2.34 2.176 Table 6 Variation in Thermal Resistivity due to Atmospheric Exposure in SW Soil Thermal resistivity (m.K/W) Exposure 8% Moisture Content 4% Moisture Content 2% Moisture Content Time (hr) 20% Dense 50% Dense 80% Dense 20% Dense 50% Dense 80% Dense 20% Dense 50% Dense 80% Dense 0 0.544 0.427 0.403 0.944 0.837 0.771 1.908 1.764 1.615 2 0.786 0.671 0.626 1.299 1.084 1.011 1.999 1.827 1.731 4 0.958 0.675 0.785 1.49 0.982 1.143 2.029 1.493 1.773 8 1.251 1.11 0.996 1.727 1.382 1.248 2.14 1.938 1.785 24 1.216 1.099 0.945 1.837 1.474 1.284 2.211 1.992 1.770 The thermal resistivity of poorly graded (SP) and well-graded (SW) sands is strongly influenced by atmospheric exposure, governed by initial moisture content, relative density, and soil gradation. The study reveals how moisture loss and particle arrangement jointly affect heat transfer in these soils. 4.3.1 Influence of Initial Moisture Content At high moisture (8%), both sands show a significant increase in resistivity (123–158%) over 24 hours due to evaporation disrupting conductive moisture films. Initial resistivity values are low (0.40–0.64 m.K/W for SP, 0.40–0.54 for SW). At moderate moisture (4%), resistivity rises moderately (69–95%) with initially higher values (0.77–1.11 m.K/W), reflecting reduced moisture and a mixed conduction regime. At low moisture (2%), Resistivity changes little (10–16%) and remains high (1.61–2.25 m.K/W) as air-filled voids dominate and moisture equilibrium is reached. 4.3.2 Effect of Relative Density Increasing density consistently lowers resistivity due to better particle contact, enhancing solid conduction. This effect is more pronounced at lower moisture levels, where solid conduction dominates. 4.3.3 Gradation Effects SW sand exhibits consistently lower Resistivity than SP sand across moisture and density levels, owing to improved particle packing and reduced void space. SW sand also shows slightly more stable resistivity trends during exposure. 4.3.4 Temporal Behaviour and Implications Thermal resistivity rises rapidly in the first 8 hours of exposure, then stabilises or slightly decreases by 24 hours, indicating moisture redistribution. These findings highlight the critical impact of atmospheric exposure on thermal properties, especially for moist soils, with important implications for geotechnical thermal applications requiring moisture control. 5. PREDICTIVE MODEL FOR THERMAL RESISTIVITY AS A FUNCTION OF MOISTURE, DENSITY, AND EXPOSURE A multilinear regression analysis was conducted to develop a predictive equation for the thermal resistivity of both SP and SW sands, explicitly considering initial moisture content, relative density, and atmospheric exposure time. The experimental dataset comprised 90 data points spanning moisture contents of 2%, 4%, and 8%; relative densities of 20%, 50%, and 80%; and exposure intervals of 0, 2, 4, 8, and 24 hours. To capture the non-linear and interaction effects among variables, a quadratic polynomial regression model was fitted with main effects and interaction terms for sand type (SP = 0, SW = 1), initial moisture content (M, %), relative density (D, %), and exposure (T, hr). The resulting equation is: Where: K: predicted thermal resistivity (m.K/W) S: sand type (0 for SP, 1 for SW) M: initial moisture content (%) D: relative density (%) T: exposure time (hr) The regression model agreed strongly with the experimental data (R² = 0.97, RMSE = 0.089 m.K/W, mean absolute error ≈ 5.5%). The predictive equation can be directly implemented or embedded in analysis tools. A Python function for practical calculations is provided below: A comparison between measured and predicted thermal resistivity values is plotted in a graph and shown in Fig. 11 ; the error rarely exceeds 15% for both sand types. 6. CONCLUSIONS This comprehensive experimental investigation of thermal resistivity in sand backfills for buried transmission cables yields several significant findings that advance both scientific understanding and practical engineering applications: 1. Influence of Soil Properties The thermal resistivity of sand is fundamentally governed by gradation characteristics, with well-graded (SW) sand consistently demonstrating 10–15% lower thermal resistivity compared to poorly graded (SP) sand across all tested conditions. This superiority stems from enhanced particle packing efficiency, which creates more effective heat transfer pathways through improved interparticle contact and reduced air-filled voids. 2. Moisture Content Effects Moisture content emerges as the most critical parameter affecting thermal resistivity, with dramatic reductions observed as water content increases from 0% to 8%. For SP sand at 20% relative density, thermal resistivity decreases from 4.401 m.K/W (dry) to 0.640 m.K/W (8% moisture), representing an 85% reduction. This behaviour is attributed to the formation of continuous moisture films that facilitate thermal conduction between soil particles. 3. Density Optimisation Increasing relative density from 20% to 80% consistently reduces thermal resistivity by 15–25% across sand types and all moisture conditions. This effect becomes more pronounced at lower moisture contents, where solid-phase conduction mechanisms dominate heat transfer processes. 4. Atmospheric Exposure Impact Environmental exposure significantly alters thermal properties, with the most dramatic changes occurring in initially moist soils. High moisture specimens (8%) experience thermal resistivity increases of up to 158% within 24 hours due to evaporative moisture loss, while low moisture specimens (2%) show minimal sensitivity to exposure duration. 5. Predictive Modelling Achievement The developed multilinear regression model successfully captures the complex interplay between sand type, moisture content, density, and exposure time, achieving excellent predictive accuracy (R² = 0.97) with mean errors below 6%. This model provides a practical tool for engineers to estimate thermal resistivity without extensive laboratory testing. 6. Engineering Implications These findings have direct applications for underground cable system design, suggesting that well-graded sand backfills with controlled moisture content and proper compaction can significantly enhance thermal performance. The sensitivity to atmospheric exposure emphasises the importance of moisture protection during installation and consideration of long-term environmental effects. 7. Future Research Directions While this study provides a solid foundation, future investigations should explore the effects of different particle shapes, mineralogy, and long-term field performance under varying climatic conditions. Additionally, the development of predictive models for other soil types would further enhance the practical utility of this research. The results of this study contribute valuable insights to the field of thermal geotechnical engineering and provide practical guidance for optimising sand backfill selection and design in underground power cable installations, ultimately supporting more efficient and reliable electrical infrastructure systems. Declarations Competing Interests The authors have no relevant financial or non-financial interests to disclose. Funding The authors declare that no funds, grants, or other support were received during the preparation of this manuscript. Author Contribution All authors contributed to the study’s conception and design. Material preparation, data collection, and analysis were performed by Vijayakumar Anbalagan and Umanath Umaiyan. The first draft of the manuscript was written by Umanath Umaiyan, and all authors commented on previous versions of the manuscript. All authors read and approved the final manuscript. Data Availability The datasets generated during and/or analysed during the current study are not publicly available due to the confidentiality of the company’s policy but are available from the corresponding author at a reasonable request. References Malmedal K, Bates C, Cain D (2014) The measurement of soil thermal stability, thermal resistivity, and underground cable ampacity, IEEE Rural Electric Power Conference (REPC), Fort Worth, TX, USA, 2014, pp. C5-1-C5-12. https://doi.org/10.1109/REPCon.2014.6842210 Enescu D, Colella P, Russo A, Porumb RF, Seritan GC (2021) Concepts and Methods to Assess the Dynamic Thermal Rating of Underground Power Cables. Energies 14(9):2591. https://doi.org/10.3390/en14092591 Campbell G, Bristow K (2002) Soil thermal resistivity. Australian Power Transmission and Distribution. PTD, Chapel Hill, Qld, pp 46–48 Garrido MI, Heras MG, Fort R, Muriel MJV (2014) Monitoring Moisture Distribution on Stone and Masonry Walls, Science, Technology and Cultural Heritage, 1st Edition, CRC Press Oclon P, Cisek P, Pilarczyk M, Taler D (2015) Numerical simulation of heat dissipation processes in underground power cable system situated in thermal backfill and buried in a multilayered soil. Energy Conv Manag 95(1):353–370. https://doi.org/10.1016/j.enconman.2015.01.092 Kroener E, Campbell GS, Bittelli M (2017) Estimation Of Thermal Instabilities In Soils Around Underground Electrical Power Cables. Vadose Zone J 16(9). https://doi.org/10.2136/vzj2017.04.0082 Brandon TL, Mitchell JK (1989) Factors Influencing Thermal Resistivity Of Sands. J Geotech Eng ASCE 115(12). https://doi.org/10.1061/(ASCE)0733-9410 (1989)115:12(1683) Nikoosokhan S, Nowamooz H, H., and, Chazallon C (2015) Effect of Dry Density, Soil Texture and Time-Spatial Variable Water Content On The Soil Thermal Conductivity, Geomechanics and Geoengineering. Int J. https://doi.org/10.1080/17486025.2015.1048313 Abu-Hamdeh N, Reeder RC (2000) Soil Thermal Conductivity: Effects of Density, Moisture, Salt Concentration, and Organic Matter. Soil Sci Soc Am J 64(4):1285–1290. https://doi.org/10.2136/sssaj2000.6441285x Cui FQ, Liu ZY, Chen JB, Dong YH, Jin L, Peng H (2020) Experimental Test and Prediction Model of Soil Thermal Conductivity in Permafrost Regions. Appl Sci 10(7):2476. https://doi.org/10.3390/app10072476 Lu Y, Lu S, Horton R, Ren T (2014) An Empirical Model for Estimating Soil Thermal Conductivity from Texture, Water Content, and Bulk Density. Soil Sci Soc Am J 78(6):1859–1868. https://doi.org/10.2136/sssaj2014.05.0218 Mitchell JK, Soga K (2005) Fundamentals of Soil Behavior, 3rd Edition, John Wiley & Sons, Hoboken Farouki OT (1986) Thermal Properties of Soils. Trans Tech, Clausthal-Zellerfeld Côté J, Konrad JM (2005) A Generalized Thermal Conductivity Model For Soils and Construction Materials. Can Geotech J 42(2):443–458. https://doi.org/10.1139/t04-106 Additional Declarations No competing interests reported. Cite Share Download PDF Status: Posted Version 1 posted You are reading this latest preprint version Research Square lets you share your work early, gain feedback from the community, and start making changes to your manuscript prior to peer review in a journal. As a division of Research Square Company, we’re committed to making research communication faster, fairer, and more useful. We do this by developing innovative software and high quality services for the global research community. Our growing team is made up of researchers and industry professionals working together to solve the most critical problems facing scientific publishing. Also discoverable on Platform About Our Team In Review Editorial Policies Advisory Board Help Center Resources Author Services Accessibility API Access RSS feed Manage Cookie Preferences © Research Square 2026 | ISSN 2693-5015 (online) Privacy Policy Terms of Service Do Not Sell My Personal Information {"props":{"pageProps":{"initialData":{"identity":"rs-7877492","acceptedTermsAndConditions":true,"allowDirectSubmit":true,"archivedVersions":[],"articleType":"Research Article","associatedPublications":[],"authors":[{"id":533637529,"identity":"deebfc57-6a4f-4389-86a6-f59fe8bc4d65","order_by":0,"name":"Vijayakumar Anbalagan","email":"","orcid":"","institution":"Fugro Suhaimi Company Limited","correspondingAuthor":false,"prefix":"","firstName":"Vijayakumar","middleName":"","lastName":"Anbalagan","suffix":""},{"id":533637532,"identity":"a49e9a0b-826a-4960-8fa9-e592b34611c9","order_by":1,"name":"Umanath Umaiyan","email":"data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZAAAAAyAQMAAABI0h/eAAAABlBMVEX///8AAABVwtN+AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAA+klEQVRIiWNgGAWjYPCCA3BSjo84HQkILcZsDMwkaAGBxDZCWgyuHX724OePOyDGw8M8NXfS26T7Dz74UcMgzy92ALuW22nmhj0Jz0AMg8M8x57ltskcZjbsOcZgOHN2Ag4tCWYSPAmHQQygFrbDuW0SyWzSjA0MCUARHFrSv0n+AWtJ/3CY59/hdDaJZPbf+LXkmElDbMkxOMzbdjgBqIWNGZ8Wyds5ZdIyaYd5gIyCg3P7DhsCHWYs2XNMAqdf+G6nb5N8Y3NYDsjY/OHNt8Py/BKJDz/8qLGR55fGrgUGeEAEEw9CQAKvcjhg/EGculEwCkbBKBhhAAD7RGFpmwbOmwAAAABJRU5ErkJggg==","orcid":"","institution":"Larsen \u0026 Toubro (India)","correspondingAuthor":true,"prefix":"","firstName":"Umanath","middleName":"","lastName":"Umaiyan","suffix":""},{"id":533637535,"identity":"b9f4bfcd-28bb-4c5f-ad1b-0e0e6ad824cc","order_by":2,"name":"Nadeem Gul","email":"","orcid":"","institution":"Larsen \u0026 Toubro (India)","correspondingAuthor":false,"prefix":"","firstName":"Nadeem","middleName":"","lastName":"Gul","suffix":""},{"id":533637537,"identity":"65c407ab-ff50-463a-8a04-da0b1a1d7dcf","order_by":3,"name":"Govindaraj V","email":"","orcid":"","institution":"Larsen \u0026 Toubro (India)","correspondingAuthor":false,"prefix":"","firstName":"Govindaraj","middleName":"","lastName":"V","suffix":""},{"id":533637538,"identity":"249c2ab4-fd84-4c1c-9f0c-fa6518ddd4fa","order_by":4,"name":"ESWARA PRASAD CHINNA RAJACHETTY","email":"","orcid":"","institution":"Larsen \u0026 Toubro (India)","correspondingAuthor":false,"prefix":"","firstName":"ESWARA","middleName":"PRASAD CHINNA","lastName":"RAJACHETTY","suffix":""}],"badges":[],"createdAt":"2025-10-16 12:08:17","currentVersionCode":1,"declarations":"","doi":"10.21203/rs.3.rs-7877492/v1","doiUrl":"https://doi.org/10.21203/rs.3.rs-7877492/v1","draftVersion":[],"editorialEvents":[],"editorialNote":"","failedWorkflow":false,"files":[{"id":94825745,"identity":"5417f734-3def-4529-b9d9-83a0abd9fbf3","added_by":"auto","created_at":"2025-10-31 06:50:40","extension":"docx","order_by":0,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":1234021,"visible":true,"origin":"","legend":"","description":"","filename":"Manuscript.docx","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/3cb18a6c979790b1effe86a5.docx"},{"id":94787202,"identity":"c79de1ef-1dea-485c-89bf-91f3d829060d","added_by":"auto","created_at":"2025-10-30 17:04:15","extension":"json","order_by":1,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":6610,"visible":true,"origin":"","legend":"","description":"","filename":"7be2c439491f45b79c9c177391e96a71.json","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/badbd872f6566e328eef3a3a.json"},{"id":94826032,"identity":"ac9da20d-40de-4a91-b1ba-0dd32d3e3b70","added_by":"auto","created_at":"2025-10-31 06:50:56","extension":"xml","order_by":2,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":80762,"visible":true,"origin":"","legend":"","description":"","filename":"7be2c439491f45b79c9c177391e96a711enriched.xml","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/0ebf1fe43b6adce796026e29.xml"},{"id":94824090,"identity":"99a8bb9d-6840-413c-95fe-b574111c738d","added_by":"auto","created_at":"2025-10-31 06:48:27","extension":"jpeg","order_by":3,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":190916,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage1.jpeg","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/66ab8b0d15db5bc8af755f3e.jpeg"},{"id":94787216,"identity":"17f986af-a988-42ec-a0c9-729ac0f0342d","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"jpeg","order_by":4,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":369313,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage10.jpeg","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/468bf44daf1f84d29f2d29dd.jpeg"},{"id":94825676,"identity":"54222e13-c34a-4850-9ee6-0dcb76f1bd36","added_by":"auto","created_at":"2025-10-31 06:50:33","extension":"jpeg","order_by":5,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":275455,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage2.jpeg","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/efb2c48be2c0d25abf2800bc.jpeg"},{"id":94787212,"identity":"ceee3116-2b14-4db2-8c6e-60fc34c3824d","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"jpeg","order_by":6,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":593392,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage3.jpeg","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/683f0ec706803504896d0e0c.jpeg"},{"id":94825316,"identity":"67b34621-62d4-4ae8-8d54-16c459dcca24","added_by":"auto","created_at":"2025-10-31 06:50:06","extension":"jpeg","order_by":7,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":924021,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage4.jpeg","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/d3874939228b770a614241c1.jpeg"},{"id":94825815,"identity":"06a7f0ac-af83-4e8b-a046-a7cf2c57887a","added_by":"auto","created_at":"2025-10-31 06:50:45","extension":"jpeg","order_by":8,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":218181,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage5.jpeg","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/205fe0c1c5a4b33d328b3056.jpeg"},{"id":94825168,"identity":"69aff32e-fc50-4c8d-ae05-6bf5331b9c00","added_by":"auto","created_at":"2025-10-31 06:49:55","extension":"jpeg","order_by":9,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":202970,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage6.jpeg","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/e2fbe1e1e0df1ba6ad4b996f.jpeg"},{"id":94825442,"identity":"c63c634a-f44f-44eb-859f-752e691491d7","added_by":"auto","created_at":"2025-10-31 06:50:17","extension":"jpeg","order_by":10,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":649202,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage7.jpeg","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/8e7dc4250aa638cbb749a548.jpeg"},{"id":94824461,"identity":"4786a3b7-455e-46ae-a1c0-e05b4837148d","added_by":"auto","created_at":"2025-10-31 06:49:01","extension":"jpeg","order_by":11,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":608153,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage8.jpeg","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/5c2f112416c406e014909a93.jpeg"},{"id":94824295,"identity":"6a1d423f-7410-4911-807d-26da9a2cb39c","added_by":"auto","created_at":"2025-10-31 06:48:46","extension":"png","order_by":12,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":133967,"visible":true,"origin":"","legend":"","description":"","filename":"floatimage9.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/ba8a18e118609d28f36315c7.png"},{"id":94787224,"identity":"da6f6a7d-5bd0-4057-9b06-deed3a4734da","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"png","order_by":13,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":40852,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage1.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/bd514c6bc3d6be7df6e91671.png"},{"id":94824284,"identity":"dcc59b2b-acdd-45c5-9411-0de2fa2b991f","added_by":"auto","created_at":"2025-10-31 06:48:45","extension":"png","order_by":14,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":137226,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage10.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/6071e7019102d7cf9109f621.png"},{"id":94787226,"identity":"83fec7d7-34de-459b-8f8f-66aba1c2034f","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"png","order_by":15,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":81759,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage2.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/8bbae9893ebc92e56b832c8f.png"},{"id":94825778,"identity":"31a2f72d-3cb4-4c7e-9982-208092207179","added_by":"auto","created_at":"2025-10-31 06:50:42","extension":"png","order_by":16,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":157430,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage3.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/5d3569c65d3b40af65362529.png"},{"id":94787235,"identity":"bea2472f-ed8b-4ebe-bc34-98bebd4757cb","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"png","order_by":17,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":240254,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage4.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/55e1bd89ff8e81786d0d82c4.png"},{"id":94787230,"identity":"06596de8-82f9-4609-ac76-f69907220e5a","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"png","order_by":18,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":60433,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage5.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/ef42979a9cc1547f474243d6.png"},{"id":94824488,"identity":"9af60a96-5340-414a-8595-8891c5d2f303","added_by":"auto","created_at":"2025-10-31 06:49:02","extension":"png","order_by":19,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":56458,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage6.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/1b62e9d7d857a349c08dd2a0.png"},{"id":94787227,"identity":"b6ce346f-8ec2-43d8-907c-93f71e3b9ae6","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"png","order_by":20,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":256365,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage7.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/dd896a375ce14e659beca803.png"},{"id":94787233,"identity":"7b0e6af4-1a5f-46a6-bd1d-0cb0863c88bd","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"png","order_by":21,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":117387,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage8.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/bfa982521680dee30b737cc7.png"},{"id":94825021,"identity":"b036ca6e-b617-42df-8b87-b5fc47979356","added_by":"auto","created_at":"2025-10-31 06:49:42","extension":"png","order_by":22,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":32418,"visible":true,"origin":"","legend":"","description":"","filename":"Onlinefloatimage9.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/2d7e39ffd602da5d223cb78f.png"},{"id":94787234,"identity":"fa3e7eed-541a-4597-bea2-78ef692334e8","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"xml","order_by":23,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":79958,"visible":true,"origin":"","legend":"","description":"","filename":"7be2c439491f45b79c9c177391e96a711structuring.xml","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/e06f3799b44064894b4e4a50.xml"},{"id":94824223,"identity":"fa5bdfe2-c843-4350-9da0-42f784562b28","added_by":"auto","created_at":"2025-10-31 06:48:40","extension":"html","order_by":24,"title":"","display":"","copyAsset":false,"role":"acdc-reference","size":85664,"visible":true,"origin":"","legend":"","description":"","filename":"earlyproof.html","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/eaf694a1646277d1dcea0920.html"},{"id":94787200,"identity":"00a21093-365d-4b38-aec8-b99ca0db6497","added_by":"auto","created_at":"2025-10-30 17:04:15","extension":"png","order_by":1,"title":"Figure 1","display":"","copyAsset":false,"role":"figure","size":77883,"visible":true,"origin":"","legend":"\u003cp\u003eGrain Size Distribution Analysis of Samples\u003c/p\u003e","description":"","filename":"1.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/e9f87fa896cefd7e9020f3cc.png"},{"id":94825816,"identity":"412d0fe5-6ee5-4244-a221-3071dbcad14a","added_by":"auto","created_at":"2025-10-31 06:50:45","extension":"png","order_by":2,"title":"Figure 2","display":"","copyAsset":false,"role":"figure","size":404991,"visible":true,"origin":"","legend":"\u003cp\u003eTLS-100 Portable Thermal Conductivity Meter\u003c/p\u003e","description":"","filename":"2.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/e3f8458847fb47d30e355a8f.png"},{"id":94824780,"identity":"fc8f6bca-1184-4e5a-b41c-fba18bdcc45a","added_by":"auto","created_at":"2025-10-31 06:49:19","extension":"png","order_by":3,"title":"Figure 3","display":"","copyAsset":false,"role":"figure","size":582313,"visible":true,"origin":"","legend":"\u003cp\u003eConducting Test in a Compacted Soil Mould\u003c/p\u003e","description":"","filename":"3.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/4faa402d6153349e76d788f6.png"},{"id":94787201,"identity":"ba7659fb-fede-4dac-a9d3-9a9fb95b2ad0","added_by":"auto","created_at":"2025-10-30 17:04:15","extension":"png","order_by":4,"title":"Figure 4","display":"","copyAsset":false,"role":"figure","size":87562,"visible":true,"origin":"","legend":"\u003cp\u003eThermal Resistivity of Sand with Various Relative Densities\u003c/p\u003e","description":"","filename":"4.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/19b86f4c84c9767113a8907a.png"},{"id":94787209,"identity":"79323087-70fd-466d-9a48-2f3e689fe587","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"png","order_by":5,"title":"Figure 5","display":"","copyAsset":false,"role":"figure","size":728374,"visible":true,"origin":"","legend":"\u003cp\u003eTesting of Soil with Varying Moisture Content\u003c/p\u003e","description":"","filename":"5.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/1e9e2c844d214f61a78d7090.png"},{"id":94787204,"identity":"ce08b64f-d1df-4bb2-b2e7-88656cecd04d","added_by":"auto","created_at":"2025-10-30 17:04:15","extension":"png","order_by":6,"title":"Figure 6","display":"","copyAsset":false,"role":"figure","size":128110,"visible":true,"origin":"","legend":"\u003cp\u003eThermal Resistivity Reduction with respect to Moisture Content on SP Sand\u003c/p\u003e","description":"","filename":"6.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/74470f9d1f7d95b4ae730134.png"},{"id":94787207,"identity":"119b14db-cd70-407c-b46f-ad87f5907fd2","added_by":"auto","created_at":"2025-10-30 17:04:15","extension":"png","order_by":7,"title":"Figure 7","display":"","copyAsset":false,"role":"figure","size":122350,"visible":true,"origin":"","legend":"\u003cp\u003eThermal Resistivity Reduction with respect to Moisture Content on SW Sand\u003c/p\u003e","description":"","filename":"7.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/7175b8a6fb1e0192ba192ab9.png"},{"id":94787217,"identity":"92c610d4-00c3-4995-9683-652e43e4e320","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"png","order_by":8,"title":"Figure 8","display":"","copyAsset":false,"role":"figure","size":745417,"visible":true,"origin":"","legend":"\u003cp\u003eSamples Kept under Direct Atmospheric Exposure\u003c/p\u003e","description":"","filename":"8.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/2b5ab6f33bc0c5e9c6d3f3d3.png"},{"id":94787205,"identity":"bfacc625-06a5-4a67-8791-81a239462e25","added_by":"auto","created_at":"2025-10-30 17:04:15","extension":"png","order_by":9,"title":"Figure 9","display":"","copyAsset":false,"role":"figure","size":144224,"visible":true,"origin":"","legend":"\u003cp\u003eThermal Resistivity Variation due to Atmospheric Exposure Time in SP Sand\u003c/p\u003e","description":"","filename":"9.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/598828b758bbd37603a16164.png"},{"id":94826024,"identity":"afb52b1b-ce43-41f1-b5d2-86bb0332a223","added_by":"auto","created_at":"2025-10-31 06:50:55","extension":"png","order_by":10,"title":"Figure 10","display":"","copyAsset":false,"role":"figure","size":135196,"visible":true,"origin":"","legend":"\u003cp\u003eThermal Resistivity Variation due to Atmospheric Exposure Time in SW Sand\u003c/p\u003e","description":"","filename":"10.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/f18a7c120f3a22d7f5b85d1a.png"},{"id":94787219,"identity":"a3b5b413-e04e-4af5-bbaa-446025f0123c","added_by":"auto","created_at":"2025-10-30 17:04:16","extension":"png","order_by":11,"title":"Figure 11","display":"","copyAsset":false,"role":"figure","size":132430,"visible":true,"origin":"","legend":"\u003cp\u003eComparison of Experimental and Predicted Thermal Resistivity Values for SP and SW Sands Using Multilinear Regression Model\u003c/p\u003e","description":"","filename":"11.png","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/f55d576881cc9d126d25d7f6.png"},{"id":94984866,"identity":"2bfeedaa-a68d-4f54-997c-59fbb6a06862","added_by":"auto","created_at":"2025-11-03 06:56:40","extension":"pdf","order_by":0,"title":"","display":"","copyAsset":false,"role":"manuscript-pdf","size":5241884,"visible":true,"origin":"","legend":"","description":"","filename":"manuscript.pdf","url":"https://assets-eu.researchsquare.com/files/rs-7877492/v1/48309074-259e-49da-8048-101e0752b60e.pdf"}],"financialInterests":"No competing interests reported.","formattedTitle":"Influence of Soil Gradation, Moisture Content, and Density on Thermal Resistivity of Soils for Buried Cable Applications","fulltext":[{"header":"1. INTRODUCTION","content":"\u003cp\u003eIn the rapidly evolving landscape of power distribution and underground utility systems, the thermal performance of cable trench backfill materials has become a critical factor in ensuring the operational efficiency and longevity of buried power cables. Among the various parameters influencing cable performance, the thermal resistivity of the surrounding soil, a measure of its resistance to heat flow, plays a pivotal role [\u003cspan citationid=\"CR1\" class=\"CitationRef\"\u003e1\u003c/span\u003e\u0026ndash;\u003cspan citationid=\"CR2\" class=\"CitationRef\"\u003e2\u003c/span\u003e]. When electrical power flows through underground cables, it inevitably generates heat. This heat must be effectively dissipated into the surrounding soil to prevent thermal overloading. If the thermal resistivity of the backfill is underestimated or improperly accounted for, the heat generated cannot escape efficiently [\u003cspan additionalcitationids=\"CR4\" citationid=\"CR3\" class=\"CitationRef\"\u003e3\u003c/span\u003e\u0026ndash;\u003cspan citationid=\"CR5\" class=\"CitationRef\"\u003e5\u003c/span\u003e]. As a result, cable temperatures may rise beyond safe operational limits, potentially leading to premature insulation failure, reduced current-carrying capacity (ampacity), and, in extreme cases, complete cable burnout [\u003cspan citationid=\"CR6\" class=\"CitationRef\"\u003e6\u003c/span\u003e]. Such failures are costly to repair and can lead to significant service interruptions and safety hazards.\u003c/p\u003e\u003cp\u003eTo mitigate these risks, engineers often rely on thermal resistivity measurements of soil to design appropriate cable trench environments, particularly by selecting or engineering suitable backfill materials. Despite its importance, the thermal resistivity of soil is not a fixed property. In contrast, it is significantly influenced by several factors, notably soil density, gradation of sand (well-graded vs. poorly graded), and moisture content [\u003cspan additionalcitationids=\"CR8\" citationid=\"CR7\" class=\"CitationRef\"\u003e7\u003c/span\u003e\u0026ndash;\u003cspan citationid=\"CR9\" class=\"CitationRef\"\u003e9\u003c/span\u003e]. [\u003cspan citationid=\"CR9\" class=\"CitationRef\"\u003e9\u003c/span\u003e] conducted laboratory studies on various Jordanian soils and found that thermal conductivity increased with soil density and moisture content. Depending on these factors, sandy soils\u0026rsquo; thermal conductivity ranged from 0.58 to 1.94 W/m\u0026middot;K. Similarly, [\u003cspan citationid=\"CR10\" class=\"CitationRef\"\u003e10\u003c/span\u003e] observed that thermal conductivity increased rapidly with moisture content up to a certain threshold (~\u0026thinsp;27%), beyond which the rate of increase diminished. This behaviour is attributed to the formation of water films and bridges between soil particles, enhancing heat transfer. These factors influence the thermal pathways within the soil by modifying particle-to-particle contact, altering the proportion and distribution of air voids, and affecting the continuity of moisture films, all of which are critical determinants of thermal resistance.\u003c/p\u003e\u003cp\u003eWhile previous studies have explored the effects of moisture and density on soil thermal resistivity, few researchers have studied the combined effect of parameters [\u003cspan citationid=\"CR11\" class=\"CitationRef\"\u003e11\u003c/span\u003e]. Still, there remains a noticeable research gap in systematically investigating the combined effect of sand gradation, compaction (Density), and moisture content, particularly in sandy backfill materials, which are commonly used due to their workability and drainage characteristics. This study aims to address this gap by experimentally examining the thermal resistivity behaviour of sands under varying gradation profiles, dry densities, and moisture contents. The study further examines how the rate at which moisture content decreases during drying impacts the thermal resistivity behaviour of the soil. The results are expected to contribute to the scientific understanding of soil thermal behaviour and provide practical guidance for engineers in selecting and designing backfill materials with optimal thermal performance for underground power cable installations.\u003c/p\u003e"},{"header":"2. MATERIALS USED","content":"\u003cp\u003eTwo types of sand with distinct gradation characteristics were selected and procured for the experimental study to investigate the effect on soil thermal resistivity. The selected sand samples were characterised in accordance with Indian Standards to determine their fundamental geotechnical properties, including particle size distribution, maximum and minimum dry densities, and angle of internal friction. The gradation curves of both samples are shown in Fig.\u0026nbsp;\u003cspan refid=\"Fig1\" class=\"InternalRef\"\u003e1\u003c/span\u003e.\u003c/p\u003e\u003cp\u003e\u003c/p\u003e\u003cp\u003eThe grain size analysis indicates that Sample 1 is classified as poorly graded sand (SP), while Sample 2 is classified as well-graded sand (SW). The additional properties of the samples are provided in Table\u0026nbsp;\u003cspan refid=\"Tab1\" class=\"InternalRef\"\u003e1\u003c/span\u003e.\u003c/p\u003e\u003cp\u003e\u003cdiv class=\"gridtable\"\u003e\u003ctable float=\"Yes\" id=\"Tab1\" border=\"1\"\u003e\u003ccaption language=\"En\"\u003e\u003cdiv class=\"CaptionNumber\"\u003eTable 1\u003c/div\u003e\u003cdiv class=\"CaptionContent\"\u003e\u003cp\u003eProperties of the Soil Samples\u003c/p\u003e\u003c/div\u003e\u003c/caption\u003e\u003ccolgroup cols=\"3\"\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c1\" colnum=\"1\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c2\" colnum=\"2\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c3\" colnum=\"3\"\u003e\u003c/div\u003e\u003cthead\u003e\u003ctr\u003e\u003cth align=\"left\" colname=\"c1\"\u003e\u003cp\u003eProperties\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c2\"\u003e\u003cp\u003eSample 1\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c3\"\u003e\u003cp\u003eSample 2\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003c/thead\u003e\u003ctbody\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eCoefficient of Uniformity (Cu)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e4\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e9\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eCoefficient of Curvature (Cc)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e1\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e1.5\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eSoil Classification\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003eSP\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003eSW\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eMaximum density (g/cc)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e1.708\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e1.820\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eMinimum density (g/cc)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e1.424\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e1.55\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eThe angle of Internal Friction (ɸ)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e34\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e38\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003c/tbody\u003e\u003c/colgroup\u003e\u003c/table\u003e\u003c/div\u003e\u003c/p\u003e\u003cdiv id=\"Sec3\" class=\"Section2\"\u003e\u003ch2\u003e2.1 Thermal Resistivity Test\u003c/h2\u003e\u003cp\u003eThermal conductivity of the specimens was measured using the TLS-100 Portable Thermal Conductivity Meter (Fig.\u0026nbsp;\u003cspan refid=\"Fig2\" class=\"InternalRef\"\u003e2\u003c/span\u003e) (Thermtest Inc., Canada), based on the Transient Line Source (TLS) method. The instrument employs a needle probe containing both a heating element and a temperature sensor, inserted directly into the sample. A known heat pulse is applied, and the resulting temperature rise is recorded over time. Thermal conductivity is determined by fitting the temperature-time response to the theoretical model of transient heat conduction. The TLS-100 is capable of measuring a wide range of materials, including soils, pastes, powders, and solids, with a typical accuracy of \u0026plusmn;\u0026thinsp;5%. Its portability and ease of operation make it particularly suitable for both laboratory and field applications.\u003c/p\u003e\u003cp\u003e\u003c/p\u003e\u003c/div\u003e"},{"header":"3. EXPERIMENTAL PROGRAMME","content":"\u003cp\u003eThe experimental study was designed to systematically investigate the thermal resistivity behaviour of granular soils under varying conditions of density, moisture content, and atmospheric exposure time. Two types of sand were selected based on their gradation characteristics: poorly graded sand (SP) and well-graded sand (SW). Initially, both soil types were tested in their dry state under three distinct compaction levels, dense, medium dense, and loose, to evaluate the influence of relative density on thermal resistivity.\u003c/p\u003e\u003cp\u003eSubsequently, each gradation type and density condition was tested after the controlled addition of 2%, 4%, 6%, and 8% water content by dry weight to assess the effect of moisture content. Following this, the specimens at all three density levels were prepared with 8% water content, sealed, and then exposed to ambient atmospheric conditions (38\u0026ndash;40\u0026deg;C). Thermal resistivity measurements were taken at 2 hours, 4 hours, 8 hours, and 24 hours post-exposure to evaluate the influence of time-dependent moisture loss and environmental temperature on thermal behaviour. Moisture content was also recorded at each time interval to correlate with changes in resistivity. This step-wise and parameter-isolated approach provided a robust dataset for understanding thermal resistivity response under varied field-simulated conditions. The detailed test matrix is shown in Table\u0026nbsp;\u003cspan refid=\"Tab2\" class=\"InternalRef\"\u003e2\u003c/span\u003e.\u003c/p\u003e\u003cp\u003e\u003cdiv class=\"gridtable\"\u003e\u003ctable float=\"Yes\" id=\"Tab2\" border=\"1\"\u003e\u003ccaption language=\"En\"\u003e\u003cdiv class=\"CaptionNumber\"\u003eTable 2\u003c/div\u003e\u003cdiv class=\"CaptionContent\"\u003e\u003cp\u003eTest Matrix of the Experimental Programme\u003c/p\u003e\u003c/div\u003e\u003c/caption\u003e\u003ccolgroup cols=\"8\"\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c1\" colnum=\"1\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c2\" colnum=\"2\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c3\" colnum=\"3\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c4\" colnum=\"4\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c5\" colnum=\"5\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c6\" colnum=\"6\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c7\" colnum=\"7\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c8\" colnum=\"8\"\u003e\u003c/div\u003e\u003cthead\u003e\u003ctr\u003e\u003cth align=\"left\" colname=\"c1\"\u003e\u003cp\u003ePhase\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c2\"\u003e\u003cp\u003eObjective\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c3\"\u003e\u003cp\u003eSoil Type\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c4\"\u003e\u003cp\u003eDensity Condition\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c5\"\u003e\u003cp\u003eMoisture Content (%)\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c6\"\u003e\u003cp\u003eExposure Time (hrs)\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c7\"\u003e\u003cp\u003eThermal Resistivity Measured\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c8\"\u003e\u003cp\u003eMoisture Content Monitored\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003c/thead\u003e\u003ctbody\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003ePhase 1\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003eEffect of Dry Density\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003eSP, SW\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003eDense, Medium, Loose\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e0 (Dry)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e-\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c7\"\u003e\u003cp\u003e✓\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c8\"\u003e\u003cp\u003eX\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003ePhase 2\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003eEffect of Moisture Content\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003eSP, SW\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003eDense, Medium, Loose\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e2, 4, 6, 8\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e-\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c7\"\u003e\u003cp\u003e✓\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c8\"\u003e\u003cp\u003eX\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003ePhase 3\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003eEffect of Atmospheric Exposure (drying)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003eSP, SW\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003eDense, Medium, Loose\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e8 (initially)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e2, 4, 8, 24\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c7\"\u003e\u003cp\u003e✓\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c8\"\u003e\u003cp\u003e✓\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003c/tbody\u003e\u003c/colgroup\u003e\u003c/table\u003e\u003c/div\u003e\u003c/p\u003e"},{"header":"4. RESULTS AND DISCUSSION","content":"\u003cp\u003eThe experimental investigations were carried out in a controlled laboratory environment, in strict accordance with the operational protocols outlined in the equipment manuals to ensure consistency and reliability. The data acquired from the tests underwent rigorous analysis, carefully considering potential variabilities. The findings are critically interpreted and systematically discussed in the following sections.\u003c/p\u003e\u003cdiv id=\"Sec6\" class=\"Section2\"\u003e\u003ch2\u003e4.1 Effect of Density\u003c/h2\u003e\u003cp\u003eAs outlined in the previous section, both soil types were compacted at different relative densities within a 1000 ml capacity mould. Subsequently, thermal resistivity tests were conducted on each prepared specimen. Figure\u0026nbsp;3 depicts the testing of thermal resistance using the TLS-100 Portable Thermal Conductivity Meter in the compacted soil. The results are analysed and drawn in a graph as presented in Fig.\u0026nbsp;\u003cspan refid=\"Fig3\" class=\"InternalRef\"\u003e4\u003c/span\u003e.\u003c/p\u003e\u003cp\u003e\u003c/p\u003e\u003cp\u003eThermal resistivity in well-graded sand found to be lower than in poorly graded sand, regardless of relative density, due to its superior particle size distribution and packing efficiency. Well-graded sand, characterised by a diverse range of particle sizes, enables smaller particles to fill voids between larger ones, enhancing inter-particle contacts and creating efficient heat transfer pathways [\u003cspan citationid=\"CR12\" class=\"CitationRef\"\u003e12\u003c/span\u003e]. This dense packing reduces air-filled voids, which exhibit high thermal resistivity, thereby improving thermal conduction [\u003cspan citationid=\"CR13\" class=\"CitationRef\"\u003e13\u003c/span\u003e]. Conversely, poorly graded sand, with its uniform particle sizes, forms a less compact structure with larger voids, limiting contact points and hindering heat flow [\u003cspan citationid=\"CR14\" class=\"CitationRef\"\u003e14\u003c/span\u003e]. Even at comparable relative densities, the broader gradation in well-graded sand ensures a more interconnected particle network, consistently resulting in lower thermal resistivity compared to the less efficient structure of poorly graded sand.\u003c/p\u003e\u003c/div\u003e\u003cdiv id=\"Sec7\" class=\"Section2\"\u003e\u003ch2\u003e4.2 Effect of Moisture Content\u003c/h2\u003e\u003cp\u003eTo investigate the influence of moisture content on the thermal resistivity of soil, experiments were conducted using both poorly graded and well-graded sands. Each sand type was prepared with varying moisture contents of 2%, 4%, 6%, and 8% by weight relative to its dry mass. The soil samples were also compacted to different relative density levels to assess the combined effects of moisture and density on thermal resistivity. This systematic approach enabled a comprehensive evaluation of how moisture content interacts with soil gradation and packing characteristics to influence thermal conduction properties. The testing system is presented in Fig.\u0026nbsp;\u003cspan refid=\"Fig4\" class=\"InternalRef\"\u003e5\u003c/span\u003e.\u003c/p\u003e\u003cp\u003e\u003c/p\u003e\u003cp\u003eThermal resistivity measurements were obtained for poorly graded and well-graded sands using specialised laboratory equipment to evaluate the effect of moisture content on the thermal resistivity of soil. Each sand type was tested at moisture contents of 2%, 4%, 6%, and 8% by weight relative to its dry mass, with samples prepared at varying relative density levels to assess the interplay of moisture and packing characteristics. Thermal resistivity values were recorded in triplicate for each combination of moisture content and relative density, and the results were averaged to ensure reliability and minimise experimental error (Farouki, 1986). The averaged data were analysed to compare the thermal resistivity trends between poorly graded and well-graded sands across the tested conditions. Figures\u0026nbsp;\u003cspan refid=\"Fig5\" class=\"InternalRef\"\u003e6\u003c/span\u003e and \u003cspan refid=\"Fig6\" class=\"InternalRef\"\u003e7\u003c/span\u003e graphically illustrate the relationships among moisture content, relative density, and thermal resistivity for poorly graded (SP) and well-graded (SW) sands. These figures highlight the effects of soil gradation and moisture content on thermal conduction properties. Corresponding thermal resistivity values for SP and SW sands, as functions of varying moisture content, are presented in Tables\u0026nbsp;\u003cspan refid=\"Tab3\" class=\"InternalRef\"\u003e3\u003c/span\u003e and \u003cspan refid=\"Tab4\" class=\"InternalRef\"\u003e4\u003c/span\u003e, respectively.\u003c/p\u003e\u003cp\u003e\u003cdiv class=\"gridtable\"\u003e\u003ctable float=\"Yes\" id=\"Tab3\" border=\"1\"\u003e\u003ccaption language=\"En\"\u003e\u003cdiv class=\"CaptionNumber\"\u003eTable 3\u003c/div\u003e\u003cdiv class=\"CaptionContent\"\u003e\u003cp\u003eVariation in Thermal Resistivity due to Moisture Content in SP Soil\u003c/p\u003e\u003c/div\u003e\u003c/caption\u003e\u003ccolgroup cols=\"6\"\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c1\" colnum=\"1\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c2\" colnum=\"2\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c3\" colnum=\"3\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c4\" colnum=\"4\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c5\" colnum=\"5\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c6\" colnum=\"6\"\u003e\u003c/div\u003e\u003cthead\u003e\u003ctr\u003e\u003cth align=\"left\" colname=\"c1\"\u003e\u003cp\u003eRelative density (%)\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colspan=\"5\" nameend=\"c6\" namest=\"c2\"\u003e\u003cp\u003e20\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003c/thead\u003e\u003ctbody\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eMoisture Content (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e0\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e2\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e4\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e6\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e8\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eThermal resistivity (m.K/W)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e4.401\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e2.52\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e1.646\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e1.069\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e0.640\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eRelative density (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colspan=\"5\" nameend=\"c6\" namest=\"c2\"\u003e\u003cp\u003e50\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eMoisture Content (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e0\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e2\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e4\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e6\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e8\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eThermal resistivity (m.K/W)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e3.580\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e2.190\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e1.340\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e0.820\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e0.501\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eRelative density (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colspan=\"5\" nameend=\"c6\" namest=\"c2\"\u003e\u003cp\u003e80\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eMoisture Content (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e0\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e2\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e4\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e6\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e8\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eThermal resistivity (m.K/W)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e3.420\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e1.954\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e1.274\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e0.824\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e0.489\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003c/tbody\u003e\u003c/colgroup\u003e\u003c/table\u003e\u003c/div\u003e\u003c/p\u003e\u003cp\u003e\u003cdiv class=\"gridtable\"\u003e\u003ctable float=\"Yes\" id=\"Tab4\" border=\"1\"\u003e\u003ccaption language=\"En\"\u003e\u003cdiv class=\"CaptionNumber\"\u003eTable 4\u003c/div\u003e\u003cdiv class=\"CaptionContent\"\u003e\u003cp\u003eVariation in Thermal Resistivity due to Moisture Content in SW Soil\u003c/p\u003e\u003c/div\u003e\u003c/caption\u003e\u003ccolgroup cols=\"6\"\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c1\" colnum=\"1\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c2\" colnum=\"2\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c3\" colnum=\"3\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c4\" colnum=\"4\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c5\" colnum=\"5\"\u003e\u003c/div\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c6\" colnum=\"6\"\u003e\u003c/div\u003e\u003cthead\u003e\u003ctr\u003e\u003cth align=\"left\" colname=\"c1\"\u003e\u003cp\u003eRelative density (%)\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colspan=\"5\" nameend=\"c6\" namest=\"c2\"\u003e\u003cp\u003e20\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003c/thead\u003e\u003ctbody\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eMoisture Content (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e0\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e2\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e4\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e6\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e8\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eThermal resistivity (m.K/W)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e4.100\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e2.125\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e1.394\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e0.912\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e0.543\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eRelative density (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colspan=\"5\" nameend=\"c6\" namest=\"c2\"\u003e\u003cp\u003e50\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eMoisture Content (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e0\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e2\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e4\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e6\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e8\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eThermal resistivity (m.K/W)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e3.220\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e1.864\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e1.210\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e0.795\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e0.455\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eRelative density (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colspan=\"5\" nameend=\"c6\" namest=\"c2\"\u003e\u003cp\u003e80\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eMoisture Content (%)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e0\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e2\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e4\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e6\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e8\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003eThermal resistivity (m.K/W)\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c2\"\u003e\u003cp\u003e3.010\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c3\"\u003e\u003cp\u003e1.659\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c4\"\u003e\u003cp\u003e1.084\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c5\"\u003e\u003cp\u003e0.698\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"left\" colname=\"c6\"\u003e\u003cp\u003e0.389\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003c/tbody\u003e\u003c/colgroup\u003e\u003c/table\u003e\u003c/div\u003e\u003c/p\u003e\u003cp\u003e\u003c/p\u003e\u003cp\u003e\u003c/p\u003e\u003cp\u003eThe thermal resistivity of poorly graded (SP) and well-graded (SW) sands decreases significantly with increasing moisture content, as observed across relative densities levels of 20%, 50%, and 80%. For SP sand, thermal resistivity drops from 4.401 m.K/W at 0% moisture to 0.640 m.K/W at 8% moisture for a relative density of 20%, with similar trends at higher density levels (Tables\u0026nbsp;\u003cspan refid=\"Tab3\" class=\"InternalRef\"\u003e3\u003c/span\u003e and \u003cspan refid=\"Tab4\" class=\"InternalRef\"\u003e4\u003c/span\u003e). For SW sand, the values are consistently lower, ranging from 3.732 m.K/W at 0% moisture to 0.543 m.K/W at 8% moisture for the same density, reflecting a reduction of approximately 15% compared to SP sand. This reduction is attributed to the enhanced particle packing in SW sand, which minimises air voids and facilitates thermal conduction. The combined effect of density and moisture content is pronounced: at higher densities (80%) and moisture content (8%), SW sand exhibits a thermal resistivity of 0.417 m.K/W, compared to 0.489 m.K/W for SP sand, indicating that increased density amplifies the moisture-induced reduction in thermal resistivity by improving inter-particle contacts and reducing insulating air gaps. These trends underscore the critical interplay between soil gradation, density, and moisture in optimising thermal performance for applications such as underground cable systems.\u003c/p\u003e\u003c/div\u003e\u003cdiv id=\"Sec8\" class=\"Section2\"\u003e\u003ch2\u003e4.3 Effect of Atmospheric Exposure\u003c/h2\u003e\u003cp\u003eTo investigate the influence of atmospheric exposure on the thermal resistivity of sands, a series of tests was conducted on poorly graded (SP) and well-graded (SW) sands prepared at relative density levels of 20%, 50%, and 80%, with a range of moisture contents of 8%, 4% and 2%. The samples were exposed to natural sunlight for durations of 2, 4, 8, and 24 hours to simulate environmental conditions (Fig.\u0026nbsp;\u003cspan refid=\"Fig7\" class=\"InternalRef\"\u003e8\u003c/span\u003e) that may alter soil properties, such as moisture loss or surface compaction, thereby affecting thermal conduction. This study is critical for applications like underground cable systems, where prolonged exposure to atmospheric conditions can impact heat dissipation efficiency. Tables\u0026nbsp;\u003cspan refid=\"Tab5\" class=\"InternalRef\"\u003e5\u003c/span\u003e and \u003cspan refid=\"Tab6\" class=\"InternalRef\"\u003e6\u003c/span\u003e present the values of varying thermal resistivity, and Figs.\u0026nbsp;9 and \u003cspan refid=\"Fig8\" class=\"InternalRef\"\u003e10\u003c/span\u003e represent the graphical representation of thermal resistivity variation based on atmospheric exposure of SP and SW sands.\u003c/p\u003e\u003cp\u003e\u003c/p\u003e\u003cp\u003e\u003cdiv class=\"gridtable\"\u003e\u003ctable float=\"Yes\" id=\"Tab5\" border=\"1\"\u003e\u003ccaption language=\"En\"\u003e\u003cdiv class=\"CaptionNumber\"\u003eTable 5\u003c/div\u003e\u003cdiv class=\"CaptionContent\"\u003e\u003cp\u003eVariation in Thermal Resistivity due to Atmospheric Exposure in SP Soil\u003c/p\u003e\u003c/div\u003e\u003c/caption\u003e\u003ccolgroup cols=\"10\"\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c1\" colnum=\"1\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c2\" colnum=\"2\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c3\" colnum=\"3\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c4\" colnum=\"4\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c5\" colnum=\"5\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c6\" colnum=\"6\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c7\" colnum=\"7\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c8\" colnum=\"8\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c9\" colnum=\"9\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c10\" colnum=\"10\"\u003e\u003c/div\u003e\u003cthead\u003e\u003ctr\u003e\u003cth align=\"left\" colspan=\"10\" nameend=\"c10\" namest=\"c1\"\u003e\u003cp\u003eThermal resistivity (m.K/W)\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003ctr\u003e\u003cth align=\"left\" colname=\"c1\"\u003e\u003cp\u003eExposure\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colspan=\"3\" nameend=\"c4\" namest=\"c2\"\u003e\u003cp\u003e8% Moisture Content\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colspan=\"3\" nameend=\"c7\" namest=\"c5\"\u003e\u003cp\u003e4% Moisture Content\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colspan=\"3\" nameend=\"c10\" namest=\"c8\"\u003e\u003cp\u003e2% Moisture Content\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003ctr\u003e\u003cth align=\"left\" colname=\"c1\"\u003e\u003cp\u003eTime (hr)\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c2\"\u003e\u003cp\u003e20% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c3\"\u003e\u003cp\u003e50% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c4\"\u003e\u003cp\u003e80% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c5\"\u003e\u003cp\u003e20% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c6\"\u003e\u003cp\u003e50% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c7\"\u003e\u003cp\u003e80% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c8\"\u003e\u003cp\u003e20% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c9\"\u003e\u003cp\u003e50% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c10\"\u003e\u003cp\u003e80% Dense\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003c/thead\u003e\u003ctbody\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e0\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e0.64\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e0.501\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e0.489\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e1.11\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e0.982\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e0.935\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e2.245\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e2.07\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e1.960\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e2\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e0.922\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e0.791\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e0.736\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e1.524\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e1.278\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e1.189\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e2.345\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e2.154\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e2.035\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e4\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e1.141\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e1.002\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e0.922\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e1.775\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e1.458\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e1.343\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e2.416\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e2.217\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e2.083\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e8\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e1.463\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e1.311\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e1.193\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e2.02\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e1.632\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e1.493\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e2.503\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e2.289\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e2.136\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e24\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e1.43\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e1.291\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e1.162\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e2.16\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e1.732\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e1.579\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e2.6\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e2.34\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e2.176\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003c/tbody\u003e\u003c/colgroup\u003e\u003c/table\u003e\u003c/div\u003e\u003c/p\u003e\u003cp\u003e\u003cdiv class=\"gridtable\"\u003e\u003ctable float=\"Yes\" id=\"Tab6\" border=\"1\"\u003e\u003ccaption language=\"En\"\u003e\u003cdiv class=\"CaptionNumber\"\u003eTable 6\u003c/div\u003e\u003cdiv class=\"CaptionContent\"\u003e\u003cp\u003eVariation in Thermal Resistivity due to Atmospheric Exposure in SW Soil\u003c/p\u003e\u003c/div\u003e\u003c/caption\u003e\u003ccolgroup cols=\"10\"\u003e\u003cdiv align=\"left\" class=\"colspec\" colname=\"c1\" colnum=\"1\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c2\" colnum=\"2\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c3\" colnum=\"3\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c4\" colnum=\"4\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c5\" colnum=\"5\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c6\" colnum=\"6\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c7\" colnum=\"7\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c8\" colnum=\"8\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c9\" colnum=\"9\"\u003e\u003c/div\u003e\u003cdiv align=\"char\" char=\".\" class=\"colspec\" colname=\"c10\" colnum=\"10\"\u003e\u003c/div\u003e\u003cthead\u003e\u003ctr\u003e\u003cth align=\"left\" colspan=\"10\" nameend=\"c10\" namest=\"c1\"\u003e\u003cp\u003eThermal resistivity (m.K/W)\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003ctr\u003e\u003cth align=\"left\" colname=\"c1\"\u003e\u003cp\u003eExposure\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colspan=\"3\" nameend=\"c4\" namest=\"c2\"\u003e\u003cp\u003e8% Moisture Content\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colspan=\"3\" nameend=\"c7\" namest=\"c5\"\u003e\u003cp\u003e4% Moisture Content\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colspan=\"3\" nameend=\"c10\" namest=\"c8\"\u003e\u003cp\u003e2% Moisture Content\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003ctr\u003e\u003cth align=\"left\" colname=\"c1\"\u003e\u003cp\u003eTime (hr)\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c2\"\u003e\u003cp\u003e20% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c3\"\u003e\u003cp\u003e50% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c4\"\u003e\u003cp\u003e80% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c5\"\u003e\u003cp\u003e20% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c6\"\u003e\u003cp\u003e50% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c7\"\u003e\u003cp\u003e80% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c8\"\u003e\u003cp\u003e20% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c9\"\u003e\u003cp\u003e50% Dense\u003c/p\u003e\u003c/th\u003e\u003cth align=\"left\" colname=\"c10\"\u003e\u003cp\u003e80% Dense\u003c/p\u003e\u003c/th\u003e\u003c/tr\u003e\u003c/thead\u003e\u003ctbody\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e0\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e0.544\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e0.427\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e0.403\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e0.944\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e0.837\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e0.771\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e1.908\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e1.764\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e1.615\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e2\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e0.786\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e0.671\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e0.626\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e1.299\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e1.084\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e1.011\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e1.999\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e1.827\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e1.731\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e4\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e0.958\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e0.675\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e0.785\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e1.49\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e0.982\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e1.143\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e2.029\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e1.493\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e1.773\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e8\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e1.251\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e1.11\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e0.996\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e1.727\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e1.382\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e1.248\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e2.14\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e1.938\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e1.785\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003ctr\u003e\u003ctd align=\"left\" colname=\"c1\"\u003e\u003cp\u003e24\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c2\"\u003e\u003cp\u003e1.216\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c3\"\u003e\u003cp\u003e1.099\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c4\"\u003e\u003cp\u003e0.945\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c5\"\u003e\u003cp\u003e1.837\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c6\"\u003e\u003cp\u003e1.474\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c7\"\u003e\u003cp\u003e1.284\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c8\"\u003e\u003cp\u003e2.211\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c9\"\u003e\u003cp\u003e1.992\u003c/p\u003e\u003c/td\u003e\u003ctd align=\"char\" char=\".\" colname=\"c10\"\u003e\u003cp\u003e1.770\u003c/p\u003e\u003c/td\u003e\u003c/tr\u003e\u003c/tbody\u003e\u003c/colgroup\u003e\u003c/table\u003e\u003c/div\u003e\u003c/p\u003e\u003cp\u003e\u003c/p\u003e\u003cp\u003eThe thermal resistivity of poorly graded (SP) and well-graded (SW) sands is strongly influenced by atmospheric exposure, governed by initial moisture content, relative density, and soil gradation. The study reveals how moisture loss and particle arrangement jointly affect heat transfer in these soils.\u003c/p\u003e\u003cdiv id=\"Sec9\" class=\"Section3\"\u003e\u003ch2\u003e4.3.1 Influence of Initial Moisture Content\u003c/h2\u003e\u003cp\u003eAt high moisture (8%), both sands show a significant increase in resistivity (123\u0026ndash;158%) over 24 hours due to evaporation disrupting conductive moisture films. Initial resistivity values are low (0.40\u0026ndash;0.64 m.K/W for SP, 0.40\u0026ndash;0.54 for SW). At moderate moisture (4%), resistivity rises moderately (69\u0026ndash;95%) with initially higher values (0.77\u0026ndash;1.11 m.K/W), reflecting reduced moisture and a mixed conduction regime. At low moisture (2%), Resistivity changes little (10\u0026ndash;16%) and remains high (1.61\u0026ndash;2.25 m.K/W) as air-filled voids dominate and moisture equilibrium is reached.\u003c/p\u003e\u003c/div\u003e\u003cdiv id=\"Sec10\" class=\"Section3\"\u003e\u003ch2\u003e4.3.2 Effect of Relative Density\u003c/h2\u003e\u003cp\u003eIncreasing density consistently lowers resistivity due to better particle contact, enhancing solid conduction. This effect is more pronounced at lower moisture levels, where solid conduction dominates.\u003c/p\u003e\u003c/div\u003e\u003cdiv id=\"Sec11\" class=\"Section3\"\u003e\u003ch2\u003e4.3.3 Gradation Effects\u003c/h2\u003e\u003cp\u003eSW sand exhibits consistently lower Resistivity than SP sand across moisture and density levels, owing to improved particle packing and reduced void space. SW sand also shows slightly more stable resistivity trends during exposure.\u003c/p\u003e\u003c/div\u003e\u003cdiv id=\"Sec12\" class=\"Section3\"\u003e\u003ch2\u003e4.3.4 Temporal Behaviour and Implications\u003c/h2\u003e\u003cp\u003eThermal resistivity rises rapidly in the first 8 hours of exposure, then stabilises or slightly decreases by 24 hours, indicating moisture redistribution. These findings highlight the critical impact of atmospheric exposure on thermal properties, especially for moist soils, with important implications for geotechnical thermal applications requiring moisture control.\u003c/p\u003e\u003c/div\u003e\u003c/div\u003e"},{"header":"5. PREDICTIVE MODEL FOR THERMAL RESISTIVITY AS A FUNCTION OF MOISTURE, DENSITY, AND EXPOSURE","content":"\u003cp\u003eA multilinear regression analysis was conducted to develop a predictive equation for the thermal resistivity of both SP and SW sands, explicitly considering initial moisture content, relative density, and atmospheric exposure time. The experimental dataset comprised 90 data points spanning moisture contents of 2%, 4%, and 8%; relative densities of 20%, 50%, and 80%; and exposure intervals of 0, 2, 4, 8, and 24 hours. To capture the non-linear and interaction effects among variables, a quadratic polynomial regression model was fitted with main effects and interaction terms for sand type (SP\u0026thinsp;=\u0026thinsp;0, SW\u0026thinsp;=\u0026thinsp;1), initial moisture content (M, %), relative density (D, %), and exposure (T, hr). The resulting equation is:\u003c/p\u003e\n\u003cp\u003e\u003cimg src=\"data:image/png;base64,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\" width=\"609\" height=\"43\"\u003e\u003c/p\u003e\n\u003cp\u003eWhere:\u003c/p\u003e\n\u003cp\u003eK: predicted thermal resistivity (m.K/W)\u003c/p\u003e\n\u003cp\u003eS: sand type (0 for SP, 1 for SW)\u003c/p\u003e\n\u003cp\u003eM: initial moisture content (%)\u003c/p\u003e\n\u003cp\u003eD: relative density (%)\u003c/p\u003e\n\u003cp\u003eT: exposure time (hr)\u003c/p\u003e\n\u003cp\u003eThe regression model agreed strongly with the experimental data (R\u0026sup2; = 0.97, RMSE\u0026thinsp;=\u0026thinsp;0.089 m.K/W, mean absolute error\u0026thinsp;\u0026asymp;\u0026thinsp;5.5%).\u003c/p\u003e\n\u003cp\u003eThe predictive equation can be directly implemented or embedded in analysis tools. A Python function for practical calculations is provided below:\u003c/p\u003e\n\u003cp\u003eA comparison between measured and predicted thermal resistivity values is plotted in a graph and shown in Fig. \u003cspan class=\"InternalRef\"\u003e11\u003c/span\u003e; the error rarely exceeds 15% for both sand types.\u003c/p\u003e\n\u003cp\u003e\u003cimg src=\"data:image/png;base64,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\" width=\"609\" height=\"791\"\u003e\u003c/p\u003e"},{"header":"6. CONCLUSIONS","content":"\u003cp\u003eThis comprehensive experimental investigation of thermal resistivity in sand backfills for buried transmission cables yields several significant findings that advance both scientific understanding and practical engineering applications:\u003c/p\u003e\n\u003ch3\u003e1. Influence of Soil Properties\u003c/h3\u003e\n\u003cp\u003eThe thermal resistivity of sand is fundamentally governed by gradation characteristics, with well-graded (SW) sand consistently demonstrating 10\u0026ndash;15% lower thermal resistivity compared to poorly graded (SP) sand across all tested conditions. This superiority stems from enhanced particle packing efficiency, which creates more effective heat transfer pathways through improved interparticle contact and reduced air-filled voids.\u003c/p\u003e\n\u003ch3\u003e2. Moisture Content Effects\u003c/h3\u003e\n\u003cp\u003eMoisture content emerges as the most critical parameter affecting thermal resistivity, with dramatic reductions observed as water content increases from 0% to 8%. For SP sand at 20% relative density, thermal resistivity decreases from 4.401 m.K/W (dry) to 0.640 m.K/W (8% moisture), representing an 85% reduction. This behaviour is attributed to the formation of continuous moisture films that facilitate thermal conduction between soil particles.\u003c/p\u003e\n\u003ch3\u003e3. Density Optimisation\u003c/h3\u003e\n\u003cp\u003eIncreasing relative density from 20% to 80% consistently reduces thermal resistivity by 15\u0026ndash;25% across sand types and all moisture conditions. This effect becomes more pronounced at lower moisture contents, where solid-phase conduction mechanisms dominate heat transfer processes.\u003c/p\u003e\n\u003ch3\u003e4. Atmospheric Exposure Impact\u003c/h3\u003e\n\u003cp\u003eEnvironmental exposure significantly alters thermal properties, with the most dramatic changes occurring in initially moist soils. High moisture specimens (8%) experience thermal resistivity increases of up to 158% within 24 hours due to evaporative moisture loss, while low moisture specimens (2%) show minimal sensitivity to exposure duration.\u003c/p\u003e\n\u003ch3\u003e5. Predictive Modelling Achievement\u003c/h3\u003e\n\u003cp\u003eThe developed multilinear regression model successfully captures the complex interplay between sand type, moisture content, density, and exposure time, achieving excellent predictive accuracy (R\u0026sup2; = 0.97) with mean errors below 6%. This model provides a practical tool for engineers to estimate thermal resistivity without extensive laboratory testing.\u003c/p\u003e\n\u003ch3\u003e6. Engineering Implications\u003c/h3\u003e\n\u003cp\u003eThese findings have direct applications for underground cable system design, suggesting that well-graded sand backfills with controlled moisture content and proper compaction can significantly enhance thermal performance. The sensitivity to atmospheric exposure emphasises the importance of moisture protection during installation and consideration of long-term environmental effects.\u003c/p\u003e\n\u003ch3\u003e7. Future Research Directions\u003c/h3\u003e\n\u003cp\u003eWhile this study provides a solid foundation, future investigations should explore the effects of different particle shapes, mineralogy, and long-term field performance under varying climatic conditions. Additionally, the development of predictive models for other soil types would further enhance the practical utility of this research.\u003c/p\u003e\u003cp\u003eThe results of this study contribute valuable insights to the field of thermal geotechnical engineering and provide practical guidance for optimising sand backfill selection and design in underground power cable installations, ultimately supporting more efficient and reliable electrical infrastructure systems.\u003c/p\u003e"},{"header":"Declarations","content":"\u003ch2\u003eCompeting Interests\u003c/h2\u003e\u003cp\u003eThe authors have no relevant financial or non-financial interests to disclose.\u003c/p\u003e\u003ch2\u003eFunding\u003c/h2\u003e\u003cp\u003eThe authors declare that no funds, grants, or other support were received during the preparation of this manuscript.\u003c/p\u003e\u003ch2\u003eAuthor Contribution\u003c/h2\u003e\u003cp\u003eAll authors contributed to the study\u0026rsquo;s conception and design. Material preparation, data collection, and analysis were performed by Vijayakumar Anbalagan and Umanath Umaiyan. The first draft of the manuscript was written by Umanath Umaiyan, and all authors commented on previous versions of the manuscript. All authors read and approved the final manuscript.\u003c/p\u003e\u003ch2\u003eData Availability\u003c/h2\u003e\u003cp\u003eThe datasets generated during and/or analysed during the current study are not publicly available due to the confidentiality of the company\u0026rsquo;s policy but are available from the corresponding author at a reasonable request.\u003c/p\u003e"},{"header":"References","content":"\u003col\u003e\u003cli\u003e\u003cspan\u003eMalmedal K, Bates C, Cain D (2014) The measurement of soil thermal stability, thermal resistivity, and underground cable ampacity, IEEE Rural Electric Power Conference (REPC), Fort Worth, TX, USA, 2014, pp. C5-1-C5-12. \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.1109/REPCon.2014.6842210\u003c/span\u003e\u003cspan address=\"10.1109/REPCon.2014.6842210\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eEnescu D, Colella P, Russo A, Porumb RF, Seritan GC (2021) Concepts and Methods to Assess the Dynamic Thermal Rating of Underground Power Cables. Energies 14(9):2591. \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.3390/en14092591\u003c/span\u003e\u003cspan address=\"10.3390/en14092591\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eCampbell G, Bristow K (2002) Soil thermal resistivity. Australian Power Transmission and Distribution. PTD, Chapel Hill, Qld, pp 46\u0026ndash;48\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eGarrido MI, Heras MG, Fort R, Muriel MJV (2014) Monitoring Moisture Distribution on Stone and Masonry Walls, Science, Technology and Cultural Heritage, 1st Edition, CRC Press\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eOclon P, Cisek P, Pilarczyk M, Taler D (2015) Numerical simulation of heat dissipation processes in underground power cable system situated in thermal backfill and buried in a multilayered soil. Energy Conv Manag 95(1):353\u0026ndash;370. \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.1016/j.enconman.2015.01.092\u003c/span\u003e\u003cspan address=\"10.1016/j.enconman.2015.01.092\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eKroener E, Campbell GS, Bittelli M (2017) Estimation Of Thermal Instabilities In Soils Around Underground Electrical Power Cables. Vadose Zone J 16(9). \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.2136/vzj2017.04.0082\u003c/span\u003e\u003cspan address=\"10.2136/vzj2017.04.0082\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eBrandon TL, Mitchell JK (1989) Factors Influencing Thermal Resistivity Of Sands. J Geotech Eng ASCE 115(12). \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.1061/(ASCE)0733-9410\u003c/span\u003e\u003cspan address=\"10.1061/(ASCE)0733-9410\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e(1989)115:12(1683)\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eNikoosokhan S, Nowamooz H, H., and, Chazallon C (2015) Effect of Dry Density, Soil Texture and Time-Spatial Variable Water Content On The Soil Thermal Conductivity, Geomechanics and Geoengineering. Int J. \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.1080/17486025.2015.1048313\u003c/span\u003e\u003cspan address=\"10.1080/17486025.2015.1048313\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eAbu-Hamdeh N, Reeder RC (2000) Soil Thermal Conductivity: Effects of Density, Moisture, Salt Concentration, and Organic Matter. Soil Sci Soc Am J 64(4):1285\u0026ndash;1290. \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.2136/sssaj2000.6441285x\u003c/span\u003e\u003cspan address=\"10.2136/sssaj2000.6441285x\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eCui FQ, Liu ZY, Chen JB, Dong YH, Jin L, Peng H (2020) Experimental Test and Prediction Model of Soil Thermal Conductivity in Permafrost Regions. Appl Sci 10(7):2476. \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.3390/app10072476\u003c/span\u003e\u003cspan address=\"10.3390/app10072476\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eLu Y, Lu S, Horton R, Ren T (2014) An Empirical Model for Estimating Soil Thermal Conductivity from Texture, Water Content, and Bulk Density. Soil Sci Soc Am J 78(6):1859\u0026ndash;1868. \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.2136/sssaj2014.05.0218\u003c/span\u003e\u003cspan address=\"10.2136/sssaj2014.05.0218\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eMitchell JK, Soga K (2005) Fundamentals of Soil Behavior, 3rd Edition, John Wiley \u0026amp; Sons, Hoboken\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eFarouki OT (1986) Thermal Properties of Soils. Trans Tech, Clausthal-Zellerfeld\u003c/span\u003e\u003c/li\u003e\u003cli\u003e\u003cspan\u003eC\u0026ocirc;t\u0026eacute; J, Konrad JM (2005) A Generalized Thermal Conductivity Model For Soils and Construction Materials. Can Geotech J 42(2):443\u0026ndash;458. \u003cspan class=\"ExternalRef\"\u003e\u003cspan class=\"RefSource\"\u003ehttps://doi.org/10.1139/t04-106\u003c/span\u003e\u003cspan address=\"10.1139/t04-106\" targettype=\"DOI\" class=\"RefTarget\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003c/ol\u003e"}],"fulltextSource":"","fullText":"","funders":[],"hasAdminPriorityOnWorkflow":false,"hasManuscriptDocX":true,"hasOptedInToPreprint":true,"hasPassedJournalQc":"","hasAnyPriority":false,"hideJournal":true,"highlight":"","institution":"","isAcceptedByJournal":false,"isAuthorSuppliedPdf":false,"isDeskRejected":"","isHiddenFromSearch":false,"isInQc":false,"isInWorkflow":false,"isPdf":false,"isPdfUpToDate":true,"isWithdrawnOrRetracted":false,"journal":{"display":true,"email":"[email protected]","identity":"researchsquare","isNatureJournal":false,"hasQc":true,"allowDirectSubmit":true,"externalIdentity":"","sideBox":"","snPcode":"","submissionUrl":"/submission","title":"Research Square","twitterHandle":"researchsquare","acdcEnabled":true,"dfaEnabled":false,"editorialSystem":"","reportingPortfolio":"","inReviewEnabled":false,"inReviewRevisionsEnabled":true},"keywords":"Thermal resistivity, Sand backfill, Buried cables, Moisture content, Atmospheric exposure, Regression modelling","lastPublishedDoi":"10.21203/rs.3.rs-7877492/v1","lastPublishedDoiUrl":"https://doi.org/10.21203/rs.3.rs-7877492/v1","license":{"name":"CC BY 4.0","url":"https://creativecommons.org/licenses/by/4.0/"},"manuscriptAbstract":"\u003cp\u003eThe thermal resistivity of sand backfills significantly affects buried power transmission cables\u0026rsquo; performance and longevity. This study examines thermal resistivity of poorly graded (SP) and well-graded (SW) sands under varying relative density, moisture content, and atmospheric exposure. Laboratory tests used the Transient Line Source method on sand samples at 20%, 50%, and 80% relative density with 0%\u0026ndash;8% moisture content. Samples with 8%, 4%, and 2% initial moisture were exposed to atmospheric conditions for up to 24 hours to assess moisture loss effects. Results show thermal resistivity decreases significantly with higher moisture content and density, with SW sand exhibiting 10\u0026ndash;15% lower resistivity than SP sand due to better particle packing. At 8% moisture, resistivity ranged from 0.489\u0026ndash;0.640 m.K/W for SP sand and 0.389\u0026ndash;0.543 m.K/W for SW sand. Atmospheric exposure increased resistivity by 123\u0026ndash;158% over 24 hours, especially at high initial moisture. A multilinear regression model incorporating sand type, moisture, density, and exposure time achieved high accuracy (R\u0026sup2; = 0.97, RMSE\u0026thinsp;=\u0026thinsp;0.089 m.K/W). These findings offer valuable insights for optimizing sand backfill selection and design, enhancing thermal management and cable ampacity in underground installations.\u003c/p\u003e","manuscriptTitle":"Influence of Soil Gradation, Moisture Content, and Density on Thermal Resistivity of Soils for Buried Cable Applications","msid":"","msnumber":"","nonDraftVersions":[{"code":1,"date":"2025-10-30 17:04:11","doi":"10.21203/rs.3.rs-7877492/v1","editorialEvents":[{"type":"communityComments","content":0}],"status":"published","journal":{"display":true,"email":"[email protected]","identity":"researchsquare","isNatureJournal":false,"hasQc":true,"allowDirectSubmit":true,"externalIdentity":"","sideBox":"","snPcode":"","submissionUrl":"/submission","title":"Research Square","twitterHandle":"researchsquare","acdcEnabled":true,"dfaEnabled":false,"editorialSystem":"","reportingPortfolio":"","inReviewEnabled":false,"inReviewRevisionsEnabled":true}}],"origin":"","ownerIdentity":"ce031f20-1b60-43ef-a75e-d6459374cde2","owner":[],"postedDate":"October 30th, 2025","published":true,"recentEditorialEvents":[],"rejectedJournal":[],"revision":"","amendment":"","status":"posted","subjectAreas":[],"tags":[],"updatedAt":"2026-01-11T02:53:36+00:00","versionOfRecord":[],"versionCreatedAt":"2025-10-30 17:04:11","video":"","vorDoi":"","vorDoiUrl":"","workflowStages":[]},"version":"v1","identity":"rs-7877492","journalConfig":"researchsquare"},"__N_SSP":true},"page":"/article/[identity]/[[...version]]","query":{"redirect":"/article/rs-7877492","identity":"rs-7877492","version":["v1"]},"buildId":"8U1c8b4HqxoKbykW_rLl7","isFallback":false,"isExperimentalCompile":false,"dynamicIds":[84888],"gssp":true,"scriptLoader":[]}

Text is read by the "Ask this paper" AI Q&A widget below. Extraction quality varies by source — PMC NXML preserves structure cleanly, OA-HTML may include some navigation residue, and OA-PDF can have broken hyphenation. The publisher copy (via DOI) is the canonical version.

My notes (saved in your browser only)

Ask this paper AI returns verbatim quotes from the full text · source: preprint-html

Answers must be backed by verbatim quotes from this paper's full text. Hallucinated quotes are dropped automatically; if no verbatim passage answers the question, we say so. How this works

Citation neighborhood (no data yet)

We don't have any in-corpus citations linked to this paper yet. This is a recent paper (2025) — citers typically take a year or two to land, and the OpenAlex reference graph may still be filling in.

Source provenance

europepmc
last seen: 2026-05-20T01:45:00.602351+00:00
unpaywall
last seen: 2026-05-26T02:00:01.498150+00:00
License: CC-BY-4.0