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Using freely available Landsat satellite imagery we extracted water surface features through the Normalized Difference Water Index (NDWI) and generated 27 cross-sections (CS) to track channel shift. The results indicated the significant shifts, notably 1426.97 m northeast shift in CS-23 and 718.55 m south shift in CS-25 attributed to sand deposition during flooding. Nearly no shifting impact was observed from CS-12 to CS-17 showing embankment and mitigation efforts being effective within this range. Study shows river is naturally multi-channeled and exhibits braided planform with sinuosity index values ranging from 1.02 to 1.38, indicating highly braided during 2010 and 2015. The river channel was found to be driven by a high sediment deposit of about 15.35 Sq. km across the 53 km range. These results are crucial for formulating integrated river basin management plans in the West Rapti River basin laying foundation for future research to explore sustainable management practices in the future. Landsat NDWI River Channel Migration West Rapti River Sinuosity Braided Figures Figure 1 Figure 2 Figure 3 Figure 4 Figure 5 Figure 6 Figure 7 Figure 8 Figure 9 Figure 10 Figure 11 Figure 12 Figure 13 Figure 14 1 Introduction Geospatial techniques have become the most frequently utilized technique for the study of diverse types of alluvial river channel planform dynamics, and their geomorphology [1, 33, 54]. River Channel Shifting, the geomorphological process mainly driven by the combination of bank erosion and point bar deposition over time [15] associated with the natural process of meandering [21], where a river forms sinuous curves [56] or bends as the river flows tends to shift river laterally within its floodplain [40, 72]. Over time, these bends can migrate laterally, causing the river channel to shift its position. Globally, many studies in fluvial geomorphology have been applying geospatial technology, such as those in the United States on the Lower Yuba River and Lower Mississippi River [28, 25], China on the Yellow River and the Ningxia-Inner Mongolia reaches of the Yellow River [69, 71, 72], Australia on the lower Pages River [20], Italy’s Piave river and Tammaro River [36, 59] , the Manu River of East India [17], Jamuna River of Bangladesh [11, 29], Spain on Jarama and Tagus rivers and several rivers reaches on Ebro basin [64, 9]. Studies by various researchers [11, 30, 34, 36] have highlighted the significance of examining channel shifts within the floodplains. River channel shifting is found to generate dynamic patterns of flow changes within alluvial river planforms distinguished by single and multi-channel [21, 56]. The complex and dynamic mechanisms involved in the evolution and alterations of channels are particularly noticeable in braided rivers [6, 19, 21]. A range of factors can influence the rate and direction of river channel migration, such as the stream power, the sediment load, the channel geometry, the floodplain topography, and the vegetation cover [39]. The progress in Remote Sensing and GIS tools has transformed how we detect changes in river channels, including erosion, accretion, and channels that remain unchanged [33]. Remotely Sensed imageries approach for studying river channel planform dynamics has been changing drastically from the collection of 6-10 band images i.e. LULC mapping to the collection of only two or three bands’ images utilization on Indices development (NDWI, MNDWI, NDVI, etc.) [60] by various researchers to identify and extract water features. Boothroyd et al. (2021) have introduced Google Earth Engine (GEE) for the study of river channel planform dynamics. Researchers have included erosion and accretion as well as landuse and land cover map to relate the channel shifting changes and its impact within the study area [15, 35]. Geographical and topographical complex country Nepal has been identified as a frequent disaster spot and was ranked 11 th & 16 th in the vulnerability of Earthquake and multi hazards respectively [53]. The Terai areas of Nepal experience higher rainfall intensity which results in higher soil erosion in the slopes of the Churia hills [13]. The rivers that flow from the hills of Churia carry a lot of silt, which erodes the riverbanks and the slopes of the hills [2]. The deposition of the sediments forces the river to change its courses driven due to frequent eating of the outer edges within the upstream channel [47, 48]. West Rapti River Basin (WRRB) found to have stages of risks in land degradation and sedimentation as the results showed that the WRRB experienced a significant decrease in forest cover and an increase in agricultural land and built-up area [14]. Stretching from Nepal's Mahabharat Range to the Chure Range, the West Rapti River (WRR) is an important watercourse that supplies water for agriculture and other purposes in the area [51, 68]. It has been identified as highly prone to floods over settlements proximity to 500 m from riverbanks [10], and soil erosion, resulting in severe losses to lives and property within local communities [27]. According to the 2019 Climate Change and Disaster Risk and Vulnerability Context Report for Province 5, certain areas face different major hazards. Tulsipur and Ghorahi sub-metropolitan cities, Lamahi municipality, Rajpur, Rapti, and Dangisharan Rural Municipality are most susceptible to flooding. Most of the river changes its course when it enters the lower part of the region i.e., the Terai region. The Rapti watershed, a major river system in the Mid-western Terai region of Nepal affected by land use land cover change (LULCC) in its surrounding areas. According to an article published by [14], the study of LULCC in the Sarada, Rapti, and Thuli Bheri river basins of Nepal during the 1995-2015 period using remote sensing revealed that an increase in agricultural lands at the expense of bare lands and forests escalated soil erosion through the years. The main issues affecting the lives and livelihoods of the people living in the lower West Rapti River basin are the deposition of sediments in the farmland by the torrents that originated in the Chure/Siwalik range, flooding, and bank cutting at various locations due to rapid geomorphological changes [62]. It is imperative to gain a comprehensive understanding of river channel shifting and braided regions along the West Rapti River, utilizing Geographical Information System (GIS) and Remote Sensing (RS) techniques to mitigate these water-related hazards. Geographic Information System (GIS) becomes suitable for analyzing and monitoring river erosion and its central line shifting [11, 32, 55, 58, 67]. The development of GIS has enhanced the capacity of the researcher to determine planform characteristics, e.g., changes in length, centerline migration, sinuosity index, etc. by combining the images of river planforms from different sources. To analyze their influence on the frequency and severity of floods in the Deukhuri Valley area of Dang district, this study intends to show the geographical and temporal patterns of river channel migration and its characteristics of the West Rapti River section from 1990 to 2023. The urgency of such efforts is underscored by the potential consequences of inaction. As highlighted by PERERA et al. (2013), failure to implement timely measures can lead to increased damage to human lives and property. By employing RS and GIS techniques, this study sheds light on the river's vulnerabilities, providing valuable data for informed decision-making. 2 Study Area The West Rapti River is selected as the study area whose length is 53 km, segment of whole West Rapti River Basin i.e., 257 km long situated in Lumbini Province of Nepal, that elongates from Bhalubang to Rihar; as shown in Fig. 1. The West Rapti River originates from the middle mountains of Nepal, then enters the lowlands, and finally drains to the Ghagra river in India, a tributary of the Ganges River [62]. Ransing River from south and Arjun River from North also drains this river. The West Rapti River is in the Lumbini province of Nepal and geographically the study area extends from 27˚47'0'' to 27˚55'30'' North latitudes and 82˚19'30'' to 82˚45'00'' East longitudes. The average annual precipitation for WRRB is about 1,534 mm and more than 80% of it occurs during the Monsoon season wets this Dune Valley i.e., study area. The study area falls within the elevation range 183 m to 1161 m. Fig 2 represent the warning and danger level of flow within the river from 1990 to 2023 in the study area. The river in Nepal's central highlands flows towards the plains and eventually empties into the Ghagra River in India (Karnali river in Nepal). The river is known as the West Rapti River because it is located downstream of where the Jhimruk and Madi Rivers drain Gadhawa, Rapti and Rajpur Rural Municipality and Lamahi Municipality of Dang district. Rainfall during the monsoon season and groundwater are the sources of runoff. People who live close to this river basin in Deukhuri (Dang), Nepal have suffered social and economic losses. The study area covers 5 wards of Gadhawa RM, 6 wards of Lamahi Municipality, 5 wards of Rajpur RM, and 5 wards of Rapti RM (Fig. 1). 3 Materials and Methods 3.1 Datasets Preparation Remote Sensing data and GIS techniques were integrated for studying River channel shifting going through the process of collection, extraction, correction, visualization, overlay and analysis. Specifically, digital satellite imageries of Landsat 5 (Thematic Mapper), Landsat 7 (Enhanced Thematic Mapper plus), Landsat 8 (OLI), and Landsat 9 (OLI-2) datasets were used in this work. These datasets retrieved from Level 2 collection on the USGS (United States Geological Survey) server which belongs to row: 143 and path: 041. As shown in Table 1 , Eight Landsat images were precisely selected for the study, covering the years 1990 to 2023, to analyze how river channels changed throughout that timeline. Table 1: Data types and its source Data Type Sensor Date of Acquisition NDWI Bands Source Landsat 5/L05 L2SP 143041 TM 1990/12/03, 1995/04/21, 2005/11/10, 2010/06/01 Bands 2 (GREEN) and Band 4(NIR) USGS Website (Earth Explorer (usgs.gov) Landsat 7 ETM+ 2000/03/25 Band 2(GREEN) and Band 4(NIR) Landsat 8 OLI 2015/10/05, 2020/05/11 Band 3(GREEN) and Band 5(NIR) Landsat 9 OLI-2 2023/02/21 Band 3(GREEN) and Band 5(NIR) ASTER GDEM Japan Satellite System (https://asterweb.jpl.nasa.gov/gdem.asp) A sequence of image processing operations, such as geometric correction, atmospheric correction, image registration, normalization, masking, and picture resampling, were performed for remotely sensed images to eliminate location coordinate discrepancies [7]. Landsat 7 images contain scanline error and thus were mostly avoided for collection so only the year 2000 was selected for study. Since the Landsat 8 launched date 2013, It has been observing earth with two key instruments Optical Land Imager (OLI) and Thermal Infrared Sensor (TIRS) whereas since 2021 launch date of Landsat 9 has been designed to mitigate the visualization of Landsat 8 upgrading instruments to OLI-2 and TIRS-2. Both satellites image the entire earth every 16 days, respectively. We preferred using Landsat 5 images from 1990 to 2010 found with low cloud cover below 5%. Besides the motive was to study channel shifting within 5-year gap but the year 2023 was selected for study of the present condition of the river channel within the study area. 3.2 Image Processing and NDWI Analysis All the Images, mainly NDWI bands were masked using the popular ArcGIS 10.8 software tool ‘Extract by Mask’ using a shape file of the study area and projected under Universal Transversal Mercator (UTM) zone 44N. Extracted image was prepared for processing in the form to extract water surface feature using Normalized Difference Water Index (NDWI) as feature tool [3, 38]. Specific spectral band images were categorized by USGS for the different remote sensing approaches as shown in Table 1 i.e., for NDWI calculation. The following formula with the help of Standard Query Language (SQL), was used to calculate NDWI in ‘Raster calculator’: NDWI=float (GREEN-NIR)/float (GREEN+NIR) (1) Separate water features of the study area for different years 1990, 1995, 2000, 2005, 2010, 2015, 2020, and 2023 were separated by reclassifying into two categories: waterbody and non-waterbody. The image was further converted to polygon using the tool ‘Raster to polygon’ within ArcGIS 10.8 environment for every NDWI image. 3.3 Digitization and Cross-section Development Digitization is considered a major task within GIS while joining one points to another to develop a map. This technique was used to develop mid-channel line (MCL) of the regular river course of the channel creating different new shape file in ‘line’ format for each year categorized for study within the study area. 27 Cross-sections were developed using River Bathymetry Toolkit (RBT), for base year 1990 river MCL with reference to this channel line we studied the shifting of the channel for respective years from 1995-2023 respectively [5, 66]. This tool utilized DEM of the study area to develop perpendicular cross-sections for MCL keeping gap of 2000m between those cross-sections. 3.4 Sinuosity and Braiding Index (BI) Sinuosity is a term that describes the degree of curviness or windingness of the line or a shape [18, 35]. Schumm (1963) defined sinuosity as “ratio of stream length to valley length”. There are different river channel patterns categorized according to sinuosity values. Friend & Sinha as well as Germanoski & Schumm in 1993 determined sinuosity to study river patterns for both single and multi-channel as they can be straight, meandering, braided and anastomosing within its planform. Sinuosity was assessed within 3 reach ‘A’, ‘B’ and ‘C’ from CS-1 to 9, CS-10 to 17 and CS-18 to 27 from 1990 to 2023 A.D respectively. The Sinuosity Index (SI) was calculated using the following reference Fig. 3 and formula as in the Eq. (2). Where, SR is the sinuosity ratio. This formula also used by Arefin et al. (2021), Lalramchulloa et al. (2021), Naim & Hredoy (2021), and Verma et al. (2021). Braid bars are the pattern of sediment/soil debris deposit throughout the river laid in the form of different irregular structures. Braiding Index is defined as the ratio of the twice of summation length of braid bar (Lr) to the length of channel reach (Lr) as shown in Fig. 4 below. The overall channel has been parted into 3 reaches. According to Brice et al. (1964) and Singh et al. (2019), Braiding Index was calculated using the following formula as provided in Eq. (3) below; Where ‘Lr’ is the length of all the bars within the reach, ‘Lm’ is the length of the reach measured midway between the banks of the channel belt. After calculating the BI value, the mean value evaluated within 3 reaches and tabulated within the MS Excel for 2D-line representation. 3.5 Determination of River channel migration and driving force River pattern within its planform was identified using the SI value while the behavior of channel shifting from 1990 to 2023 AD was identified in 6 directions North, Northeast, Northwest, Southeast, Southwest, and South with specified distance. It was calculated using GIS-based ‘measure tool’ which identified the distance the river has shifted with reference to base year 1990 AD by overlaying the MCL of other years: 1995, 2000, 2005, 2010, 2015, 2020, and 2023 respectively. Measured Distance were tabulated and spatio-temporal map was developed to observe the behavior analysis and the shifting of river channel within its planform. Converted polygons of river channel from ‘1990-2023’ were superimposed to obtain the aggregate deposited area till 2023 determines the spatial coverage and driver of river migration within its planform since 1990. In order to understand the area covered and the historical deposition, the river channel and MCL of the years 1990 and 2023 were superimposed and examined. The given Figure 5 provides the flow model diagram that was used for this research work. 4 Results and Discussion 4.1 Sinuosity Index Natural River channel usually shows unpredictable behavior thus to identify their patterns within the floodplain sinuosity has been identified. The Sinuosity Index (SI) was determined by digitizing the river channel's centerline to establish a consistent river pathway (Stream Length), which differed between 53.67 km and 52.82 km, as illustrated in Fig. 6. Additionally, an imaginary representation of the river channel's pathway (Valley Length) was considered. The resulting numerical outputs for the years 1990, 1995, 2000, 2005, 2010, 2015, 2020, and 2023 are presented in Fig. 6 and Fig. 7 below. As shown in Fig. 7, reach wise river pattern of flow was assessed under respective years where the value ranges from 1.02 to 1.38 i.e. <1.5 where river found multi-channel determined as braided nature on its planform. A higher sinuosity value observed in the year 2015 which was 1.38 at Reach C (CS-18 to CS-27) and lower value at Reach A was 1.02 respectively. Fig. 6 graph trend looks matching the Fig. 7 graph trend where river sinuosity and mid channel line length observed higher at the same year 2015 i.e., 54.79 km and SI- 1.02 to 1.38. The pattern of the river channel-braiding index determined from GIS in the form of map as shown in Fig. 8 and Fig 12. The river channel 2015 found highly braided from the GIS mapping and analysis the braided trend started in 2015 where the bifurcation observed higher at CS-13 to CS-16 and CS-18 to CS-21. After the construction of embankment along both side of the river in year 2020, we found the regular channel was brought under control upto CS-16 but channel found evolved beyond CS-18. 4.2 Channel Migration (Mid-line Migration) West Rapti River (WRR) shifting trend was analyzed using Remote Sensing data and GIS techniques within its planform under 27 cross-sections from east to west over 53 km range. Spatio-temporal maps of river channel generated by overlapping the mid-channel line of the years 1990, 1995, 2000, 2005, 2010, 2015, 2020 and 2023 respectively as shown in Fig. 9. The Fig. 9 shows those cross-sections, MCL overlay, and locations where the channel flows. The river channel shift was observed in 6 directions only whereas the channel flows from East to West. When the channel shift was evaluated, the year 1990 was used as the base year. We observed that the channel shift was higher in the following years: 1995 under CS-19; 2000 under CS-14 and CS-23; 2005 under CS-11, CS-19, and CS-23; 2010 under CS-23; 2015 not found above 800 m but above 700 m on CS-11 and CS-14; 2020 under CS-23 and CS-25; as well as 2023 under CS-11 and CS-23 separately. In altogether the channel shifting was found highest over CS-11 and CS-23 from 1990 to 2023 i.e., 808.47 m and 1426.97 m respectively. While the channel movement was also recorded in 6 directions where we dig out that within CS-5, CS-8, CS-9, and CS-12 in Southwest direction since 1990 then within CS-11, CS-19, and CS-23 in Northeast direction and within CS-25 and CS-27 in South and Southeast direction respectively as shown in Table 2 and Fig. 11. From Fig. 10 and table 2, We have figured out that there was highest shift of the river channel at CS-23 in Northeast direction, also at CS-19 channel shift was found in both direction North and South since year 1990. Table 2: Tabular descriptions of WRR mid-channel line shifting distance and direction from 1990 to 2023 where year 1990 riverline taken as base year where N: North, NE:Northeast, NW: Northwest, SE: Southeast, SW:Southwest, and S:South. (Year_dist: shifting Distance and Year_dir: shifting direction) Fig. 11 represents the channel pattern at different cross-sections from 1 to 27 where we can observe the shift of river channel from 1990 to 2023. The place where the channel was in 1990 and 2023 can be individually observed as provided from top to bottom CS-1 to CS-27 respectively with the flow, shift distance and direction. In CS-1 the river has shifted 304.98 m southeast whereas at CS-27 the river had shifted 386.73 m Southeast direction. 4.3 Braiding Index Calculation Braiding pattern of the West Rapti River found decreasing in trend might be the impact of river embankments development by Nepal government. The trend was found decreasing from 1990 to 1995 then increasing until 2010 at last the trend decreased up to year 2023 i.e. 1.64 to 1.03. As provided in Fig. 12 below, maximum mean braiding index (BI) depicts that the channel has highest number of braid bars i.e. 1.76 in year 2010 and minimum mean BI depicts the lowest number i.e. 0.76 in year 1995 respectively throughout the river channel. 4.4 Geospatial determination of driver for channel migration This study within the river area explains that the channel found braided according to SI and BI values and had undergone successive phases of erosion and deposition processes from 1990 to 2023. This clarifies that the channel had a higher deposition, about 15.35 Sq. km, at these cross-section areas as shown in Fig. 13, that forced river to shift higher and portions of river found colonized by the vegetation within the area. Maximum historical deposition of sand bars found highly at CS-9 to 13 and CS-18 to 21 where the channel shifting found higher due the expansion and contraction of riverbed bars throughout the channel. Heavy deposition found halt at CS-13 to 16 after year 2020 due to engineering structures like embankment found on both sides of the channel at these cross-sections and others too. Vegetation : As given in Fig. 14, 2023 google earth image showing vegetation colonized at CS-18 to CS-21 region that is comparable to Fig. 13(C) due to regular sediment deposition and the channel with island bar formed within the region since 2015. 4.5 Discussions Every Monsoon brings a huge flood within the river channel. The dynamic nature of WRR from 1990 to 2023 within its planform enlightened through the GIS maps as shown above. We found irregular patterns of changes throughout the river channel under respective timeline of 33 years. These changes brought several shifting due to sandbars, point bars, braid bars, mid-channel bars, etc., formation as well as torrent rivers in the south which are the major drivers of west rapti river channel shifting. Confluence points were found to be the main widening part of this river channel that appeared differential patterns i.e., Arjun River, Ransing River and other torrent rivers within West Rapti River. Talchabhadel and Sharma (2014) found in his research that torrent river caused river channel shifting. The channel shifting was maximum on CS-23 in the year 2023 i.e., 1426.97 m Northeast with respect to base year 1990. Also, within cross-section 25 there was instant shift from 54.39 m to 827.87 m from year 2005 to 2020. In average channel shifting was highly observed in between cross-section 18-21. Whereas CS-2 and CS-24 depict that the channel has been repositioned as it was in the year 1990. The riverbanks were really conserved in the places where mitigation measures were implemented throughout the channel. Typical features like point bars, cut banks, meanders, anabranching, and braiding were found due to river channel migration. Baniya et. al., (2023) have also found a similar river pattern within Koshi river that shifted about 2 km from 1999 to 2019. The digitised imaginary line from the corresponding year follows the regular channel course, but since 2015, the channel has shifted primarily towards the northeast. We discovered that the trend of channel shifting was increasing, which led to continuous shifting that expanded the river floodplain structure within CS-18 to CS-21. Karnali river channel shifting study by Rakhal et. al., (2021) also found fang development i.e. heavy expansion of the river due to regular erosion and deposition. With the observation of the field, we identified significant and transformative multichannel developments and movements within cross-sections 18 to 21, as well as in CS-9 to 13. Notably, cross-sections 13 to 16 exhibit a controlled channel behavior, attributed to the strategic implementation of embankments on both sides. This proactive measure, initiated in the year 2020, aims to effectively mitigate the impact of floods on human settlements. The channel's geomorphic characteristics reveal a distinctive meandering behavior, particularly evident from cross-section 22 onward. Noteworthy is the transition of the channel from a multichannel flow with braid bars to forming a single flow. Prior to this transition, the channel displayed a complex multichannel structure, characterized by the presence of braid bars throughout its course. An additional observation of interest pertains to the colonization of the former riverbed area by vegetation. This phenomenon is indicative of dynamic changes and irregular shifts in the river channel. Such ecological alterations underscore the intricate interplay between geomorphological processes and ecological dynamics in the studied region. Further investigation reveals a discernible southwestward shift in the channel within CS-22 since the year 2000, albeit of minimal magnitude. This directional shift is a noteworthy aspect of the channel's trajectory and contributes to our understanding of its long-term spatial dynamics. Bifurcation of the river channel first started at CS-14 where an expansion started to begin from year 2000 thus was brought into single channel from 2021. Similar changes in the pattern were found within CS-18 to CS-21 where it started to bifurcate from year 2015 expansion can be visualized in recent map i.e. year 2023. 5 Conclusion Analysis of historical Landsat imagery on GIS environment reveals a dynamic pattern of river channel shifting within the West Rapti River over the past three decades plus 3 years sums up from 1990 to 2023. According to SI and BI values, the river channel displayed braided pattern within its planform, which is unpredictable in natural dynamics of river behavior. Spatially, it is observed that the river has experienced both lateral expansion and contractions showing rapid changes in river course like in CS-23 and CS-25 where channel shifting increase from 29.90 m to 1426.79 m NE whereas 72.45 m to 718.55 m S respectively from 1990 to 2023 while others exhibit more stable patterns. Heavy sediment deposits started to gather since 2010 in the downstream region of West Rapti River that is CS 16-27 at study area. As there was no research in past events thus this will be the guiding document for the Integrated watershed management programs and activities within the study area. Since Nepal has been shown to be extremely vulnerable to water-related disasters, the Deukhuri valley in Dang has been discovered to be extremely vulnerable to these kinds of disasters, which may not be enough. While the focus of this study was not on the erosion and accretion of the river channel, tracking flood inundation is a significant area of interest for future research on this river using Sentinel-1 SAR imagery. Declarations Acknowledgement: We are thankful to known and unknown helping hands whose generous sharing of information and guidance have been crucial in shaping this research. Their on-the-ground knowledge and insights have provided a vital perspective that greatly enriched our findings. We acknowledge the Faculty of Forestry, Agriculture and Forestry University for providing an enriching academic environment that nurtured this research endeavor. Consent for publication: The publishing of this research article has the complete approval of all its authors. We all concur that the material, conclusions, and submission for publication are sound. Conflict of Interest/Competing Interest: The authors declare that they have no known competing financial interests or personal relationships that could have appeared to influence the work reported in this paper. Data Availability: Not applicable. Code Availability : Not applicable. Funding: This research did not receive any specific grant from funding agencies in the public, commercial, or not for profit sectors. Authorship: S.G, P.P, and D.D conceptualized the article, critically revised the work. S.G and R.S performed the data curation. The original manuscript was prepared by S.G. Data analysis and software operation was carried out by S.G and D.D. Review and editing was done by S.G, D.D, R.S, and O.M. 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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-4319789","acceptedTermsAndConditions":true,"allowDirectSubmit":false,"archivedVersions":[],"articleType":"Research Article","associatedPublications":[],"authors":[{"id":305502096,"identity":"682c2603-81ae-4b96-ae81-9373ce7dbf52","order_by":0,"name":"Sandesh 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08:15:15","extension":"png","order_by":5,"title":"Figure 5","display":"","copyAsset":false,"role":"figure","size":19748,"visible":true,"origin":"","legend":"\u003cp\u003e\u003cem\u003eFlow-model for study on assessment of West Rapti River channel migration\u003c/em\u003e\u003c/p\u003e","description":"","filename":"Fig5.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/e5c49463d753890f474a178d.png"},{"id":56998565,"identity":"231571f5-afa1-4c78-ac22-18a0c653260a","added_by":"auto","created_at":"2024-05-23 08:07:15","extension":"png","order_by":6,"title":"Figure 6","display":"","copyAsset":false,"role":"figure","size":101583,"visible":true,"origin":"","legend":"\u003cp\u003eCurve Showing Trend of Regular Mid-channel line length of West Rapti River from 1990 to 2023.\u003c/p\u003e","description":"","filename":"Fig6.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/cbfe2c20d9c0b48f2c763d81.png"},{"id":56998568,"identity":"7392d05a-e0fd-46ad-8f82-731a00f6e314","added_by":"auto","created_at":"2024-05-23 08:07:15","extension":"png","order_by":7,"title":"Figure 7","display":"","copyAsset":false,"role":"figure","size":115599,"visible":true,"origin":"","legend":"\u003cp\u003eGraph showing the reachwise sinuosity index of the river channel from 1990 to 2023\u003c/p\u003e","description":"","filename":"Fig7.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/cd7a6b6fd416e441d96efd1e.png"},{"id":56998575,"identity":"8032d07f-245e-428b-b33e-4dc841a11f38","added_by":"auto","created_at":"2024-05-23 08:07:15","extension":"png","order_by":8,"title":"Figure 8","display":"","copyAsset":false,"role":"figure","size":354047,"visible":true,"origin":"","legend":"\u003cp\u003ePattern of River channel spatial changes within the study area from 1990 to 2023\u003c/p\u003e","description":"","filename":"Fig8.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/e68d032fe871c9b412095530.png"},{"id":56998578,"identity":"79fe82f7-65ca-4ffe-940e-eab5c0244bff","added_by":"auto","created_at":"2024-05-23 08:07:15","extension":"png","order_by":9,"title":"Figure 9","display":"","copyAsset":false,"role":"figure","size":200478,"visible":true,"origin":"","legend":"\u003cp\u003e\u003cem\u003eOverlay map of West Rapti River mid-channel lines (MCL) from 1990 to 2023 with 27 cross-sections and respective locations\u003c/em\u003e\u003c/p\u003e","description":"","filename":"Fig9.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/0b6541c25a687991a0b97b2e.png"},{"id":56999569,"identity":"b149af7c-56b3-4fb1-b8ba-d81f353d413e","added_by":"auto","created_at":"2024-05-23 08:23:15","extension":"png","order_by":10,"title":"Figure 10","display":"","copyAsset":false,"role":"figure","size":306566,"visible":true,"origin":"","legend":"\u003cp\u003e\u003cem\u003e2D-Line Diagrammatic visualization of the river channel shifting from 1990 to 2023 where the year 1990 is taken as base year.\u003c/em\u003e\u003c/p\u003e","description":"","filename":"Fig10.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/ff66277cf3352513a6031721.png"},{"id":56999129,"identity":"74b7f21a-2e7b-46c6-b4fd-a5a2ea683c55","added_by":"auto","created_at":"2024-05-23 08:15:15","extension":"png","order_by":11,"title":"Figure 11","display":"","copyAsset":false,"role":"figure","size":745523,"visible":true,"origin":"","legend":"\u003cp\u003e\u003cem\u003eChannel midline and river channel overlay of 1990 and 2023 river channel polygons along with the flow direction and river shift distance (meter) and directions\u003c/em\u003e\u003c/p\u003e","description":"","filename":"Fig11.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/fe03bf29e05bc015f74d1f4b.png"},{"id":56998570,"identity":"69ef8847-dad5-491e-b274-c0f91ad7e6f3","added_by":"auto","created_at":"2024-05-23 08:07:15","extension":"png","order_by":12,"title":"Figure 12","display":"","copyAsset":false,"role":"figure","size":70631,"visible":true,"origin":"","legend":"\u003cp\u003e2D-line depicting mean braiding index within the 3 reaches of West Rapti River\u003c/p\u003e","description":"","filename":"Fig12.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/1800954a11dafd2ceff63bd3.png"},{"id":56999132,"identity":"2eea4743-6766-4b6f-9d5f-0d62e457857e","added_by":"auto","created_at":"2024-05-23 08:15:15","extension":"png","order_by":13,"title":"Figure 13","display":"","copyAsset":false,"role":"figure","size":601287,"visible":true,"origin":"","legend":"\u003cp\u003e\u003cem\u003e(A-D): Aggregate sand deposited area at different cross-sections obtained from superimposed River channels from 1990-2023 along with their locations and present physical structures\u003c/em\u003e\u003c/p\u003e","description":"","filename":"Fig13.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/cfee5849f7350ceede0a014f.png"},{"id":56999130,"identity":"3e90c49e-26ab-411e-bfe2-fdefa3a247f8","added_by":"auto","created_at":"2024-05-23 08:15:15","extension":"png","order_by":14,"title":"Figure 14","display":"","copyAsset":false,"role":"figure","size":1043179,"visible":true,"origin":"","legend":"\u003cp\u003eRiver channel from CS-18 to CS-21 where vegetation colonized the sediment region within red circle (source: GEP, 2023)\u003c/p\u003e","description":"","filename":"Fig14.png","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/456e8e3a1f4c871c3d8ec222.png"},{"id":75351430,"identity":"ea65dcd7-4f88-407f-909c-5c1240b02fe1","added_by":"auto","created_at":"2025-02-03 16:11:12","extension":"pdf","order_by":0,"title":"","display":"","copyAsset":false,"role":"manuscript-pdf","size":5999774,"visible":true,"origin":"","legend":"","description":"","filename":"manuscript.pdf","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/a6604d50-ce09-4352-aa6e-c2798570f898.pdf"},{"id":56999128,"identity":"0d6d15f5-292f-45cc-be30-81a52c9771bc","added_by":"auto","created_at":"2024-05-23 08:15:15","extension":"docx","order_by":1,"title":"","display":"","copyAsset":false,"role":"supplement","size":1127293,"visible":true,"origin":"","legend":"","description":"","filename":"Appendix.docx","url":"https://assets-eu.researchsquare.com/files/rs-4319789/v1/95ffe329557bdb964db7c64d.docx"}],"financialInterests":"No competing interests reported.","formattedTitle":"GIS and Remote Sensing Based Assessment of West Rapti River Channel Migration in Nepal","fulltext":[{"header":"1 Introduction","content":"\u003cp\u003eGeospatial techniques have become the most frequently utilized technique for the study of diverse types of alluvial river channel planform dynamics, and their geomorphology [1, 33, 54]. River Channel Shifting, the geomorphological process mainly driven by the combination of bank erosion and point bar deposition over time [15] associated with the natural process of meandering\u0026nbsp;[21],\u0026nbsp;where a river forms sinuous curves\u0026nbsp;[56] or bends as the river flows tends to shift river laterally within its floodplain [40, 72]. Over time, these bends can migrate laterally, causing the river channel to shift its position. Globally, many studies in fluvial geomorphology have been applying geospatial technology, such as those in the United States on the Lower Yuba River and Lower Mississippi River [28, 25], China on the Yellow River and the Ningxia-Inner Mongolia reaches of the Yellow River [69, 71, 72], Australia on the lower Pages River [20], Italy\u0026rsquo;s Piave river and Tammaro River [36, 59] , the Manu River of East India [17], Jamuna River of Bangladesh [11, 29], Spain on Jarama and Tagus rivers and several rivers reaches on Ebro basin [64, 9].\u003c/p\u003e\n\u003cp\u003eStudies by various researchers [11, 30, 34, 36] have highlighted the significance of examining channel shifts within the floodplains. River channel shifting is found to generate dynamic patterns of flow changes within alluvial river planforms distinguished by single and multi-channel [21, 56]. The complex and dynamic mechanisms involved in the evolution and alterations of channels are particularly noticeable in braided rivers [6, 19, 21]. A range of factors can influence the rate and direction of river channel migration, such as the stream power, the sediment load, the channel geometry, the floodplain topography, and the vegetation cover [39]. The progress in Remote Sensing and GIS tools has transformed how we detect changes in river channels, including erosion, accretion, and channels that remain unchanged [33]. Remotely Sensed imageries approach for studying river channel planform dynamics has been changing drastically from the collection of 6-10 band images i.e. LULC mapping to the collection of only two or three bands\u0026rsquo; images utilization on Indices development (NDWI, MNDWI, NDVI, etc.) [60]\u0026nbsp;by various researchers to identify and extract water features. Boothroyd et al. (2021)\u0026nbsp;have introduced Google Earth Engine (GEE) for the study of river channel planform dynamics. Researchers have included erosion and accretion as well as landuse and land cover map to relate the channel shifting changes and its impact within the study area [15, 35].\u003c/p\u003e\n\u003cp\u003eGeographical and topographical complex country Nepal has been identified as a frequent disaster spot and was ranked 11\u003csup\u003eth\u003c/sup\u003e \u0026amp; 16\u003csup\u003eth\u003c/sup\u003e in the vulnerability of Earthquake and multi hazards respectively [53]. The Terai areas of Nepal experience higher rainfall intensity which results in higher soil erosion in the slopes of the Churia hills [13]. The rivers that flow from the hills of Churia carry a lot of silt, which erodes the riverbanks and the slopes of the hills [2]. The deposition of the sediments forces the river to change its courses driven due to frequent eating of the outer edges within the upstream channel [47, 48]. West Rapti River Basin (WRRB) found to have stages of risks in land degradation and sedimentation as the results showed that the WRRB experienced a significant decrease in forest cover and an increase in agricultural land and built-up area [14]. Stretching from Nepal\u0026apos;s Mahabharat Range to the Chure Range, the West Rapti River (WRR) is an important watercourse that supplies water for agriculture and other purposes in the area [51, 68]. It has been identified as highly prone to floods over settlements proximity to 500 m from riverbanks [10], and soil erosion, resulting in severe losses to lives and property within local communities [27]. According to the 2019 Climate Change and Disaster Risk and Vulnerability Context Report for Province 5, certain areas face different major hazards. Tulsipur and Ghorahi sub-metropolitan cities, Lamahi municipality, Rajpur, Rapti, and Dangisharan Rural Municipality are most susceptible to flooding. \u0026nbsp;Most of the river changes its course when it enters the lower part of the region i.e., the Terai region.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eThe Rapti watershed, a major river system in the Mid-western Terai region of Nepal affected by land use land cover change (LULCC) in its surrounding areas. According to an article published by [14],\u0026nbsp;the study of LULCC in the Sarada, Rapti, and Thuli Bheri river basins of Nepal during the 1995-2015 period using remote sensing revealed that an increase in agricultural lands at the expense of bare lands and forests escalated soil erosion through the years. The main issues affecting the lives and livelihoods of the people living in the lower West Rapti River basin are the deposition of sediments in the farmland by the torrents that originated in the Chure/Siwalik range, flooding, and bank cutting at various locations due to rapid geomorphological changes [62].\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eIt is imperative to gain a comprehensive understanding of river channel shifting and braided regions along the West Rapti River, utilizing Geographical Information System (GIS) and Remote Sensing (RS) techniques to mitigate these water-related hazards. Geographic Information System (GIS) becomes suitable for analyzing and monitoring river erosion and its central line shifting [11, 32, 55, 58, 67]. The development of GIS has enhanced the capacity of the researcher to determine planform characteristics, e.g., changes in length, centerline migration, sinuosity index, etc. by combining the images of river planforms from different sources. To analyze their influence on the frequency and severity of floods in the Deukhuri Valley area of Dang district, this study intends to show the geographical and temporal patterns of river channel migration and its characteristics of the West Rapti River section from 1990 to 2023. The urgency of such efforts is underscored by the potential consequences of inaction. As highlighted by PERERA et al. (2013), failure to implement timely measures can lead to increased damage to human lives and property. By employing RS and GIS techniques, this study sheds light on the river\u0026apos;s vulnerabilities, providing valuable data for informed decision-making.\u003c/p\u003e"},{"header":"2 Study Area","content":"\u003cp\u003eThe West Rapti River is selected as the study area whose length is 53 km, segment of whole West Rapti River Basin i.e., 257 km long situated in Lumbini Province of Nepal, that elongates from Bhalubang to Rihar; as shown in Fig. 1. The West Rapti River originates from the middle mountains of Nepal, then enters the lowlands, and finally drains to the Ghagra river in India, a tributary of the Ganges River [62]. Ransing River from south and Arjun River from North also drains this river. The West Rapti River is in the Lumbini province of Nepal and geographically the study area extends from \u003cstrong\u003e27˚47\u0026apos;0\u0026apos;\u0026apos;\u0026nbsp;\u003c/strong\u003eto \u003cstrong\u003e27˚55\u0026apos;30\u0026apos;\u0026apos;\u0026nbsp;\u003c/strong\u003eNorth latitudes and\u003cstrong\u003e\u0026nbsp;82˚19\u0026apos;30\u0026apos;\u0026apos;\u0026nbsp;\u003c/strong\u003eto \u003cstrong\u003e82˚45\u0026apos;00\u0026apos;\u0026apos;\u003c/strong\u003e East longitudes. The average annual precipitation for WRRB is about 1,534 mm and more than 80% of it occurs during the Monsoon season wets this Dune Valley i.e., study area. The study area falls within the elevation range 183 m to 1161 m. Fig 2 represent the warning and danger level of flow within the river from 1990 to 2023 in the study area. The river in Nepal\u0026apos;s central highlands flows towards the plains and eventually empties into the Ghagra River in India (Karnali river in Nepal). The river is known as the West Rapti River because it is located downstream of where the Jhimruk and Madi Rivers drain Gadhawa, Rapti and Rajpur Rural Municipality and Lamahi Municipality of Dang district. Rainfall during the monsoon season and groundwater are the sources of runoff. People who live close to this river basin in Deukhuri (Dang), Nepal have suffered social and economic losses. The study area covers 5 wards of Gadhawa RM, 6 wards of Lamahi Municipality, 5 wards of Rajpur RM, and 5 wards of Rapti RM (Fig. 1).\u003c/p\u003e"},{"header":"3 Materials and Methods","content":"\u003cp\u003e\u003cstrong\u003e3.1 Datasets Preparation\u0026nbsp;\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eRemote Sensing data and GIS techniques were integrated for studying River channel shifting going through the process of collection, extraction, correction, visualization, overlay and analysis. Specifically, digital satellite imageries of Landsat 5 (Thematic Mapper), Landsat 7 (Enhanced Thematic Mapper plus), Landsat 8 (OLI), and Landsat 9 (OLI-2) datasets were used in this work. These datasets retrieved from Level 2 collection on the USGS (United States Geological Survey) server which belongs to row: 143 and path: 041. As shown in Table \u003ca href=\"#table1\"\u003e1\u003c/a\u003e, Eight Landsat images were precisely selected for the study, covering the years 1990 to 2023, to analyze how river channels changed throughout that timeline.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eTable 1:\u003c/strong\u003e Data types and its source\u003c/p\u003e\n\u003ctable border=\"1\" cellspacing=\"0\" cellpadding=\"0\" width=\"92%\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd width=\"11.34020618556701%\" valign=\"top\"\u003e\n \u003cp\u003eData Type\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"9.278350515463918%\" valign=\"top\"\u003e\n \u003cp\u003eSensor\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"19.587628865979383%\" valign=\"top\"\u003e\n \u003cp\u003eDate of Acquisition\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"29.896907216494846%\" valign=\"top\"\u003e\n \u003cp\u003eNDWI Bands\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"29.896907216494846%\" valign=\"top\"\u003e\n \u003cp\u003eSource\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd width=\"11.34020618556701%\" valign=\"top\"\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003cp\u003eLandsat 5/L05 L2SP 143041\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"9.278350515463918%\" valign=\"top\"\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003cp\u003eTM\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"19.587628865979383%\" valign=\"top\"\u003e\n \u003cp\u003e1990/12/03,\u0026nbsp;\u003c/p\u003e\n \u003cp\u003e1995/04/21,\u003c/p\u003e\n \u003cp\u003e2005/11/10,\u003c/p\u003e\n \u003cp\u003e2010/06/01\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"29.896907216494846%\" valign=\"top\"\u003e\n \u003cp\u003eBands 2 (GREEN) and Band 4(NIR)\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"29.896907216494846%\" rowspan=\"4\" valign=\"top\"\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003cp\u003eUSGS Website\u0026nbsp;\u003c/p\u003e\n \u003cp\u003e(Earth Explorer (usgs.gov)\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd width=\"16.176470588235293%\" valign=\"top\"\u003e\n \u003cp\u003eLandsat 7\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"13.235294117647058%\" valign=\"top\"\u003e\n \u003cp\u003eETM+\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"27.941176470588236%\" valign=\"top\"\u003e\n \u003cp\u003e2000/03/25\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"42.64705882352941%\" valign=\"top\"\u003e\n \u003cp\u003eBand 2(GREEN) and Band 4(NIR)\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd width=\"16.176470588235293%\" valign=\"top\"\u003e\n \u003cp\u003eLandsat 8\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"13.235294117647058%\" valign=\"top\"\u003e\n \u003cp\u003eOLI\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"27.941176470588236%\" valign=\"top\"\u003e\n \u003cp\u003e2015/10/05,\u003c/p\u003e\n \u003cp\u003e2020/05/11\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"42.64705882352941%\" valign=\"top\"\u003e\n \u003cp\u003eBand 3(GREEN) and Band 5(NIR)\u003c/p\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd width=\"16.176470588235293%\" valign=\"top\"\u003e\n \u003cp\u003eLandsat 9\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"13.235294117647058%\" valign=\"top\"\u003e\n \u003cp\u003eOLI-2\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"27.941176470588236%\" valign=\"top\"\u003e\n \u003cp\u003e2023/02/21\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"42.64705882352941%\" valign=\"top\"\u003e\n \u003cp\u003eBand 3(GREEN) and Band 5(NIR)\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd width=\"11.34020618556701%\" valign=\"top\"\u003e\n \u003cp\u003eASTER GDEM\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"9.278350515463918%\" valign=\"top\"\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"19.587628865979383%\" valign=\"top\"\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"29.896907216494846%\" valign=\"top\"\u003e\n \u003cp\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd width=\"29.896907216494846%\" valign=\"top\"\u003e\n \u003cp\u003eJapan Satellite System (https://asterweb.jpl.nasa.gov/gdem.asp)\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003e\u003cbr\u003e\u003c/p\u003e\n\u003cp\u003eA sequence of image processing operations, such as geometric correction, atmospheric correction, image registration, normalization, masking, and picture resampling, were performed for remotely sensed images to eliminate location coordinate discrepancies [7]. Landsat 7 images contain scanline error and thus were mostly avoided for collection so only the year 2000 was selected for study. Since the Landsat 8 launched date 2013, It has been observing earth with two key instruments Optical Land Imager (OLI) and Thermal Infrared Sensor (TIRS) whereas since 2021 launch date of Landsat 9 has been designed to mitigate the visualization of Landsat 8 upgrading instruments to OLI-2 and TIRS-2. Both satellites image the entire earth every 16 days, respectively. We preferred using Landsat 5 images from 1990 to 2010 found with low cloud cover below 5%. Besides the motive was to study channel shifting within 5-year gap but the year 2023 was selected for study of the present condition of the river channel within the study area.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e3.2 Image Processing and NDWI Analysis\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eAll the Images, mainly NDWI bands were masked using the popular ArcGIS 10.8 software tool \u0026lsquo;Extract by Mask\u0026rsquo; using a shape file of the study area and projected under Universal Transversal Mercator (UTM) zone 44N. Extracted image was prepared for processing in the form to extract water surface feature using Normalized Difference Water Index (NDWI) as feature tool [3, 38]. Specific spectral band images were categorized by USGS for the different remote sensing approaches as shown in Table 1 i.e., for NDWI calculation. The following formula with the help of Standard Query Language (SQL), was used to calculate NDWI in \u0026lsquo;Raster calculator\u0026rsquo;:\u003c/p\u003e\n\u003cp\u003eNDWI=float (GREEN-NIR)/float (GREEN+NIR) \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; \u0026nbsp; (1)\u003c/p\u003e\n\u003cp\u003eSeparate water features of the study area for different years 1990, 1995, 2000, 2005, 2010, 2015, 2020, and 2023 were separated by reclassifying into two categories: waterbody and non-waterbody. The image was further converted to polygon using the tool \u0026lsquo;Raster to polygon\u0026rsquo; within ArcGIS 10.8 environment for every NDWI image.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e3.3 Digitization and Cross-section Development\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eDigitization is considered a major task within GIS while joining one points to another to develop a map. This technique was used to develop mid-channel line (MCL) of the regular river course of the channel creating different new shape file in \u0026lsquo;line\u0026rsquo; format for each year categorized for study within the study area. 27 Cross-sections were developed using River Bathymetry Toolkit (RBT), for base year 1990 river MCL with reference to this channel line we studied the shifting of the channel for respective years from 1995-2023 respectively [5, 66]. This tool utilized DEM of the study area to develop perpendicular cross-sections for MCL keeping gap of 2000m between those cross-sections.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e3.4 Sinuosity and Braiding Index (BI)\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eSinuosity is a term that describes the degree of curviness or windingness of the line or a shape [18, 35]. Schumm (1963) defined sinuosity as \u0026ldquo;ratio of stream length to valley length\u0026rdquo;. There are different river channel patterns categorized according to sinuosity values. Friend \u0026amp; Sinha as well as Germanoski \u0026amp; Schumm in 1993 determined sinuosity to study river patterns for both single and multi-channel as they can be straight, meandering, braided and anastomosing within its planform. Sinuosity was assessed within 3 reach \u0026lsquo;A\u0026rsquo;, \u0026lsquo;B\u0026rsquo; and \u0026lsquo;C\u0026rsquo; from CS-1 to 9, CS-10 to 17 and CS-18 to 27 from 1990 to 2023 A.D respectively. The Sinuosity Index (SI) was calculated using the following reference Fig. 3 and formula as in the Eq. (2).\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cimg src=\"data:image/png;base64,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\" width=\"616\" height=\"49\"\u003e\u003c/p\u003e\n\u003cp\u003eWhere, SR is the sinuosity ratio. This formula also used by \u0026nbsp;Arefin et al. (2021), Lalramchulloa et al. (2021), Naim \u0026amp; Hredoy (2021), and Verma et al. (2021).\u003c/p\u003e\n\u003cp\u003eBraid bars are the pattern of sediment/soil debris deposit throughout the river laid in the form of different irregular structures. Braiding Index is defined as the ratio of the twice of summation length of braid bar (Lr) to the length of channel reach (Lr) as shown in Fig. \u003ca href=\"#fig4a\"\u003e4\u003c/a\u003e below. The overall channel has been parted into 3 reaches. According to Brice et al. (1964) and Singh et al. (2019), Braiding Index was calculated using the following formula as provided in Eq. (3) below;\u003c/p\u003e\n\u003cp\u003e\u003cimg src=\"data:image/png;base64,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\" width=\"632\" height=\"52\"\u003e\u003c/p\u003e\n\u003cp\u003eWhere \u0026lsquo;Lr\u0026rsquo; is the length of all the bars within the reach, \u0026lsquo;Lm\u0026rsquo; is the length of the reach measured midway between the banks of the channel belt.\u003c/p\u003e\n\u003cp\u003eAfter calculating the BI value, the mean value evaluated within 3 reaches and tabulated within the MS Excel for 2D-line representation.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e3.5 Determination of River channel migration and driving force\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eRiver pattern within its planform was identified using the SI value while the behavior of channel shifting from 1990 to 2023 AD was identified in 6 directions North, Northeast, Northwest, Southeast, Southwest, and South with specified distance. It was calculated using GIS-based \u0026lsquo;measure tool\u0026rsquo; which identified the distance the river has shifted with reference to base year 1990 AD by overlaying the MCL of other years: 1995, 2000, 2005, 2010, 2015, 2020, and 2023 respectively. Measured Distance were tabulated and spatio-temporal map was developed to observe the behavior analysis and the shifting of river channel within its planform. Converted polygons of river channel from \u0026lsquo;1990-2023\u0026rsquo; were superimposed to obtain the aggregate deposited area till 2023 determines the spatial coverage and driver of river migration within its planform since 1990. In order to understand the area covered and the historical deposition, the river channel and MCL of the years 1990 and 2023 were superimposed and examined. The given Figure 5 provides the flow model diagram that was used for this research work.\u003c/p\u003e"},{"header":"4 Results and Discussion","content":"\u003cp\u003e\u003cstrong\u003e4.1 Sinuosity Index\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eNatural River channel usually shows unpredictable behavior thus to identify their patterns within the floodplain sinuosity has been identified. The Sinuosity Index (SI) was determined by digitizing the river channel\u0026apos;s centerline to establish a consistent river pathway (Stream Length), which differed between 53.67 km and 52.82 km, as illustrated in Fig. 6. Additionally, an imaginary representation of the river channel\u0026apos;s pathway (Valley Length) was considered. The resulting numerical outputs for the years 1990, 1995, 2000, 2005, 2010, 2015, 2020, and 2023 are presented in Fig. 6 and Fig. 7 below.\u003c/p\u003e\n\u003cp\u003eAs shown in Fig. 7, reach wise river pattern of flow was assessed under respective years where the value ranges from 1.02 to 1.38 i.e. \u0026lt;1.5 where river found multi-channel determined as braided nature on its planform. \u0026nbsp;A higher sinuosity value observed in the year 2015 which was 1.38 at Reach C (CS-18 to CS-27) and lower value at Reach A was 1.02 respectively. Fig. 6 graph trend looks matching the Fig. 7 graph trend where river sinuosity and mid channel line length observed higher at the same year 2015 i.e., 54.79 km and SI- 1.02 to 1.38.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eThe pattern of the river channel-braiding index determined from GIS in the form of map as shown in Fig. 8 and Fig 12. The river channel 2015 found highly braided from the GIS mapping and analysis the braided trend started in 2015 where the bifurcation observed higher at CS-13 to CS-16 and CS-18 to CS-21. After the construction of embankment along both side of the river in year 2020, we found the regular channel was brought under control upto CS-16 but channel found evolved beyond CS-18.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e4.2 Channel Migration (Mid-line Migration)\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eWest Rapti River (WRR) shifting trend was analyzed using Remote Sensing data and GIS techniques within its planform under 27 cross-sections from east to west over 53 km range. Spatio-temporal maps of river channel generated by overlapping the mid-channel line of the years 1990, 1995, 2000, 2005, 2010, 2015, 2020 and 2023 respectively as shown in Fig. 9. The Fig. 9 shows those cross-sections, MCL overlay, and locations where the channel flows. The river channel shift was observed in 6 directions only whereas the channel flows from East to West.\u003c/p\u003e\n\u003cp\u003eWhen the channel shift was evaluated, the year 1990 was used as the base year. We observed that the channel shift was higher in the following years: 1995 under CS-19; 2000 under CS-14 and CS-23; 2005 under CS-11, CS-19, and CS-23; 2010 under CS-23; 2015 not found above 800 m but above 700 m on CS-11 and CS-14; 2020 under CS-23 and CS-25; as well as 2023 under CS-11 and CS-23 separately. In altogether the channel shifting was found highest over CS-11 and CS-23 from 1990 to 2023 i.e., 808.47 m and 1426.97 m respectively. While the channel movement was also recorded in 6 directions where we dig out that within CS-5, CS-8, CS-9, and CS-12 in Southwest direction since 1990 then within CS-11, CS-19, and CS-23 in Northeast direction and within CS-25 and CS-27 in South and Southeast direction respectively as shown in Table 2 and Fig. 11.\u003c/p\u003e\n\u003cp\u003eFrom Fig. 10 and table 2, We have figured out that there was highest shift of the river channel at CS-23 in Northeast direction, also at CS-19 channel shift was found in both direction North and South since year 1990.\u003c/p\u003e\n\u003cp\u003e\u003cem\u003eTable 2: Tabular descriptions of WRR mid-channel line shifting distance and direction from 1990 to 2023 where year 1990 riverline taken as base year where N: North, NE:Northeast, NW: Northwest, SE: Southeast, SW:Southwest, and S:South. (Year_dist: shifting Distance and Year_dir: shifting direction)\u003c/em\u003e\u003c/p\u003e\n\u003cp\u003e\u003cem\u003e\u003cimg 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\" height=\"449\" width=\"780\"\u003e\u003c/em\u003e\u003c/p\u003e\n\u003cp\u003e\u003cem\u003e\u003cbr\u003e\u003c/em\u003e\u003c/p\u003e\n\u003cp\u003eFig. 11 represents the channel pattern at different cross-sections from 1 to 27 where we can observe the shift of river channel from 1990 to 2023. The place where the channel was in 1990 and 2023 can be individually observed as provided from top to bottom CS-1 to CS-27 respectively with the flow, shift distance and direction. In CS-1 the river has shifted 304.98 m southeast whereas at CS-27 the river had shifted 386.73 m Southeast direction.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e4.3 Braiding Index Calculation\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eBraiding pattern of the West Rapti River found decreasing in trend might be the impact of river embankments development by Nepal government. The trend was found decreasing from 1990 to 1995 then increasing until 2010 at last the trend decreased up to year 2023 i.e. 1.64 to 1.03. As provided in Fig. 12 below, maximum mean braiding index (BI) depicts that the channel has highest number of braid bars i.e. 1.76 in year 2010 and minimum mean BI depicts the lowest number i.e. 0.76 in year 1995 respectively throughout the river channel.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e4.4 Geospatial determination of driver for channel migration\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThis study within the river area explains that the channel found braided according to SI and BI values and had undergone successive phases of erosion and deposition processes from 1990 to 2023. This clarifies that the channel had a higher deposition, about 15.35 Sq. km, at these cross-section areas as shown in Fig. 13, that forced river to shift higher and portions of river found colonized by the vegetation within the area.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eMaximum historical deposition of sand bars found highly at CS-9 to 13 and CS-18 to 21 where the channel shifting found higher due the expansion and contraction of riverbed bars throughout the channel. Heavy deposition found halt at CS-13 to 16 after year 2020 due to engineering structures like embankment found on both sides of the channel at these cross-sections and others too.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eVegetation\u003c/strong\u003e: As given in Fig. 14, 2023 google earth image showing vegetation colonized at CS-18 to CS-21 region that is comparable to Fig. 13(C) due to regular sediment deposition and the channel with island bar formed within the region since 2015.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e4.5 Discussions\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eEvery Monsoon brings a huge flood within the river channel. The dynamic nature of WRR from 1990 to 2023 within its planform enlightened through the GIS maps as shown above. We found irregular patterns of changes throughout the river channel under respective timeline of 33 years. These changes brought several shifting due to sandbars, point bars, braid bars, mid-channel bars, etc., formation as well as torrent rivers in the south which are the major drivers of west rapti river channel shifting. Confluence points were found to be the main widening part of this river channel that appeared differential patterns i.e., Arjun River, Ransing River and other torrent rivers within West Rapti River. Talchabhadel and Sharma (2014) found in his research that torrent river caused river channel shifting.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eThe channel shifting was maximum on CS-23 in the year 2023 i.e., 1426.97 m Northeast with respect to base year 1990. Also, within cross-section 25 there was instant shift from 54.39 m to 827.87 m from year 2005 to 2020. In average channel shifting was highly observed in between cross-section 18-21. Whereas CS-2 and CS-24 depict that the channel has been repositioned as it was in the year 1990. \u0026nbsp;\u003c/p\u003e\n\u003cp\u003eThe riverbanks were really conserved in the places where mitigation measures were implemented throughout the channel. Typical features like point bars, cut banks, meanders, anabranching, and braiding were found due to river channel migration. Baniya et. al., (2023) have also found a similar river pattern within Koshi river that shifted about 2 km from 1999 to 2019. The digitised imaginary line from the corresponding year follows the regular channel course, but since 2015, the channel has shifted primarily towards the northeast. We discovered that the trend of channel shifting was increasing, which led to continuous shifting that expanded the river floodplain structure within CS-18 to CS-21. Karnali river channel shifting study by Rakhal et. al., (2021) also found fang development i.e. heavy expansion of the river due to regular erosion and deposition.\u003c/p\u003e\n\u003cp\u003eWith the observation of the field, we identified significant and transformative multichannel developments and movements within cross-sections 18 to 21, as well as in CS-9 to 13. Notably, cross-sections 13 to 16 exhibit a controlled channel behavior, attributed to the strategic implementation of embankments on both sides. This proactive measure, initiated in the year 2020, aims to effectively mitigate the impact of floods on human settlements. The channel\u0026apos;s geomorphic characteristics reveal a distinctive meandering behavior, particularly evident from cross-section 22 onward. Noteworthy is the transition of the channel from a multichannel flow with braid bars to forming a single flow. Prior to this transition, the channel displayed a complex multichannel structure, characterized by the presence of braid bars throughout its course.\u003c/p\u003e\n\u003cp\u003eAn additional observation of interest pertains to the colonization of the former riverbed area by vegetation. This phenomenon is indicative of dynamic changes and irregular shifts in the river channel. Such ecological alterations underscore the intricate interplay between geomorphological processes and ecological dynamics in the studied region. Further investigation reveals a discernible southwestward shift in the channel within CS-22 since the year 2000, albeit of minimal magnitude. This directional shift is a noteworthy aspect of the channel\u0026apos;s trajectory and contributes to our understanding of its long-term spatial dynamics.\u003c/p\u003e\n\u003cp\u003eBifurcation of the river channel first started at CS-14 where an expansion started to begin from year 2000 thus was brought into single channel from 2021. Similar changes in the pattern were found within CS-18 to CS-21 where it started to bifurcate from year 2015 expansion can be visualized in recent map i.e. year 2023.\u003c/p\u003e"},{"header":"5 Conclusion","content":"\u003cp\u003eAnalysis of historical Landsat imagery on GIS environment reveals a dynamic pattern of river channel shifting within the West Rapti River over the past three decades plus 3 years sums up from 1990 to 2023. According to SI and BI values, the river channel displayed braided pattern within its planform, which is unpredictable in natural dynamics of river behavior. Spatially, it is observed that the river has experienced both lateral expansion and contractions showing rapid changes in river course like in CS-23 and CS-25 where channel shifting increase from 29.90 m to 1426.79 m NE whereas 72.45 m to 718.55 m S respectively from 1990 to 2023 while others exhibit more stable patterns. Heavy sediment deposits started to gather since 2010 in the downstream region of West Rapti River that is CS 16-27 at study area. As there was no research in past events thus this will be the guiding document for the Integrated watershed management programs and activities within the study area.\u003c/p\u003e\n\u003cp\u003eSince Nepal has been shown to be extremely vulnerable to water-related disasters, the Deukhuri valley in Dang has been discovered to be extremely vulnerable to these kinds of disasters, which may not be enough. While the focus of this study was not on the erosion and accretion of the river channel, tracking flood inundation is a significant area of interest for future research on this river using Sentinel-1 SAR imagery.\u0026nbsp;\u003c/p\u003e"},{"header":"Declarations","content":"\u003cp\u003e\u003cstrong\u003eAcknowledgement:\u0026nbsp;\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eWe are thankful to known and unknown helping hands whose generous sharing of information and guidance have been crucial in shaping this research. Their on-the-ground knowledge and insights have provided a vital perspective that greatly enriched our findings. We acknowledge the Faculty of Forestry, Agriculture and Forestry University for providing an enriching academic environment that nurtured this research endeavor.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eConsent for publication:\u003c/strong\u003e The publishing of this research article has the complete approval of all its authors. We all concur that the material, conclusions, and submission for publication are sound.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eConflict of Interest/Competing Interest:\u0026nbsp;\u003c/strong\u003eThe authors declare that they have no known competing financial interests or personal relationships that could have appeared to influence the work reported in this paper.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eData Availability:\u0026nbsp;\u003c/strong\u003eNot applicable.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eCode Availability\u003c/strong\u003e: Not applicable.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eFunding:\u0026nbsp;\u003c/strong\u003eThis research did not receive any specific grant from funding agencies in the public, commercial, or not for profit sectors.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eAuthorship:\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eS.G, P.P, and D.D conceptualized the article, critically revised the work. S.G and R.S performed the data curation. The original manuscript was prepared by S.G. Data analysis and software operation was carried out by S.G and D.D. Review and editing was done by S.G, D.D, R.S, and O.M.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eOpen Access:\u003c/strong\u003e This article is licensed under a Creative Commons Attribution 4.0 International License, which permits use, sharing, adaptation, distribution and reproduction in any medium or format, as long as you give appropriate credit to the original author(s) and the source, provide a link to the Creative Commons license, and indicate if changes were made. The images or other third party materials in this article are included in the article\u0026rsquo;s Creative Commons license, unless indicated otherwise in a credit line to the material. 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Planform channel dynamics along the Ningxia-Inner Mongolia reaches of the Yellow River from 1958 to 2008: Analysis using Landsat images and topographic maps. \u003cem\u003eEnvironmental Earth Sciences\u003c/em\u003e, \u003cem\u003e70\u003c/em\u003e(1). https://doi.org/10.1007/s12665-012-2106-0\u003c/li\u003e\n\u003c/ol\u003e"}],"fulltextSource":"","fullText":"","funders":[],"hasAdminPriorityOnWorkflow":false,"hasManuscriptDocX":true,"hasOptedInToPreprint":true,"hasPassedJournalQc":"","hasAnyPriority":false,"hideJournal":false,"highlight":"","institution":"","isAcceptedByJournal":true,"isAuthorSuppliedPdf":false,"isDeskRejected":"","isHiddenFromSearch":false,"isInQc":false,"isInWorkflow":false,"isPdf":false,"isPdfUpToDate":true,"isWithdrawnOrRetracted":false,"journal":{"display":true,"email":"
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