The Impact of Foreign Direct Investments on Labor Market Indicators of the Philippines using the Granger Causality

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Abstract This study examines the impact of foreign direct investment (FDI) on employment growth in the Philippines. The study investigates how FDI affects labor market indicators, including labor force participation, employment, unemployment, and underemployment rates in the long run. Using the yearly data from the World Bank and Philippines Statistics Authority from 1991 to 2022 and the Granger Causality Test, the findings suggest that the number of observations and lags of FDI to labor force participation rate and FDI to employment rate show a significant impact. Nevertheless, the Granger Causality suggests that FDI positively affects both labor force participation and employment rates in the long run and emphasizes the importance of attracting FDI for stimulating employment growth and overall economic development.
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The Impact of Foreign Direct Investments on Labor Market Indicators of the Philippines using the Granger Causality | 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 The Impact of Foreign Direct Investments on Labor Market Indicators of the Philippines using the Granger Causality Janine Leah Maquilan, Ashley Conception, Freshcykate Colongon, and 4 more This is a preprint; it has not been peer reviewed by a journal. https://doi.org/ 10.21203/rs.3.rs-6291054/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 This study examines the impact of foreign direct investment (FDI) on employment growth in the Philippines. The study investigates how FDI affects labor market indicators, including labor force participation, employment, unemployment, and underemployment rates in the long run. Using the yearly data from the World Bank and Philippines Statistics Authority from 1991 to 2022 and the Granger Causality Test, the findings suggest that the number of observations and lags of FDI to labor force participation rate and FDI to employment rate show a significant impact. Nevertheless, the Granger Causality suggests that FDI positively affects both labor force participation and employment rates in the long run and emphasizes the importance of attracting FDI for stimulating employment growth and overall economic development. Foreign Direct Investment Granger Causality Employment Growth Employment Rate Underemployment Rate Labor Force Participation Rate and Unemployment Rate Figures Figure 1 1. Introduction Labor market indicators are essential tools that provide insight into a country's economic health by tracking employment trends, wage changes, and other vital metrics. In the context of the Philippines, the Philippine Statistics Authority (PSA) provides these insights through its Key Labor and Employment Indicators, which include the employment rate, labor force participation rate, under-employment rate, and unemployment rate. For instance, the employment rate, which measures the percentage of the employed working-age population, stood at 95.2% in July 2023. This figure represents a slight increase from July 2022's 94.8% but a marginal decrease from June 2023's 95.5%. The labor force participation rate, indicating the share of the population working or actively looking for work, was recorded at 60.1% in July 2023, a decrease from the previous year's 65.2% and June 2023's 66.17%. The under-employment rate, which accounts for those working less than 40 hours a week, rose to 15.9% in July 2023, up from 13.8% in July 2022 and 12.0% in June 2023. Lastly, the unemployment rate, reflecting the percentage of the jobless labor force, was at 4.8% in July 2023, down from 5.2% in July 2022 but up from 4.5% in June 2023. These figures collectively suggest that the Philippines maintains a relatively high employment rate, indicating a robust labor market. Sharmistha et al. ( 2019 ) assert that Foreign Direct Investment (FDI) significantly and positively influences job creation, thereby boosting employment growth. FDIs are investments from one country to another, where the investor gains substantial interest and influence in a foreign enterprise (OECD, n.d.). Sharmistha et al. ( 2019 ) found this impact particularly strong in East and South Asia and, to a lesser degree, in Latin America. Mpanju ( 2012 ) observed similar effects in Tanzania, with FDI contributing to job creation, technology transfer, and managerial expertise. Research in six Middle Eastern and North African nations—Egypt, Jordan, Lebanon, Morocco, Tunisia, and Turkey—indicates that FDI lowers unemployment rates (Alawneh and Nessa, 2020). Tang and Kwan ( 2020 ) note the beneficial impact of foreign investment on employment across various industries in Malaysia. In Vietnam, FDI firms have outpaced domestic companies in generating jobs, with positive employment spillovers to the local sector (Dao et al., 2023 ). However, Sharmistha et al. ( 2019 ) also observed that this trend is reversed in Sub-Saharan Africa, the Middle East and North Africa, suggesting a significant regional variation. In India, while job creation is evident, FDI is not considered a significant contributor to this trend (Mishra & Palit, 2020 ). Lastly, Jude and Silaghi ( 2016 ) found that in the EU, FDI can lead to 'creative destruction' in the job market, potentially displacing existing employment. Due to the varying results of existing studies in other countries and regions, this study aims to examine the impact of FDIs on employment growth in the Philippines on a time series analysis. According to the World Bank, the Philippines has had an average total FDI of US $ 9.3 Billion for the past five years. In 2022 alone, the Philippines accumulated US $ 9.2 Billion in FDIs. The data provided show the immense number of FDIs in the Philippines. Nonetheless, Valenton and Garcia-Vigonti (2022) point out that the Philippines faces certain obstacles that limit FDI, such as the Foreign Investment Act (R.A. 7042, 1991, amended by R.A. 8179, 1996), which requires a minimum of 60% Filipino ownership in businesses, with the rest open to foreign investors. Despite these limitations, FDIs have the potential to significantly influence employment opportunities and growth in the Philippines over time. According to the study of Agbola, F. W. (2009) suggests that foreign direct investment. (FDI) is a precursor to economic growth in the Philippines. Similarly, Sugui et al. ( 2023 ) found that factors such as inflation, labor force, and population size are determinants of living standards in the Philippines, with FDI not playing a role. Masipa Tshepo's (2014) findings also support the notion that FDI leads to increases in GDP and employment, with evidence of a positive correlation between these variables in South Africa from 1990 to 2013. In India, G. Goenka ( 2013 ) discovered that FDI influences GDP in the short term and employment in the long term. Conversely, Campos & Kinoshita ( 2002 ) observed that FDI might have a negligible or even negative effect on job growth in Eastern European and Baltic nations. Lastly, a study by Addo Eric Osei (2019) in Ghana indicated no causal link between FDI and employment growth during 2000–2016. Much of the literature available has focused on economic growth, including employment, but not on employment growth alone. However, a study by Setyanti and Wahyudi ( 2021 ), using the Granger causality between FDI and youth employment, noted that in Indonesia, Malaysia, the Philippines, and Singapore, the FDI inflow leads to youth employment, while the relationship in Thailand is vice versa. While the study of Setyanti and Wahyudi ( 2021 ) on the Granger causality between FDI and employment growth in ASEAN countries, including the Philippines, the study focuses on youth employment for individuals joining the labor force at the age of 15–24. The study only posits that FDIs impact youth employment rather than the employment of the labor force in general. In the Philippines, the labor force covers 15 years old and above. As FDIs are not solely beneficial to youth employment, this study looks at the impact of FDIs on various labor market indicators beyond youth employment, contributing to a more nuanced understanding of FDI's role in shaping the Philippine labor market. 1.1 Conceptual Framework This study is based on the Global Value Chain Theory, which suggests that Foreign Direct Investment (FDI) can boost job creation, yet it may also result in the loss of existing jobs. As global value chains (GVCs) expand, countries become more interlinked and focus on particular tasks and segments within value chains, moving away from broad industry specializations (OECD, 2013 ). Jude and Silaghi ( 2016 ) highlight the significant impact foreign investors have on job creation in a country via various mechanisms. They suggest that Foreign Direct Investment (FDI) in the Philippines is a key driver for engaging the workforce and influencing employment and unemployment statistics. These statistics reflect the proportion of the population that is either jobless or working. While FDI is generally anticipated to boost job opportunities and have a favorable effect on employment, there are instances where it might result in job loss, as noted by Hale and Xu (2016). The conceptual framework shown in Fig. 1 illustrates the variables that would be considered. This study identifies the Philippines' Foreign Direct Investment (FDI) as the independent variable, suggesting that FDI may influence the nation's employment figures (Nawas, 2024). The dependent variables relate to the Philippines' employment rates, part of the Labor Force Framework. This includes the Labor Force Participation Rate, Unemployment Rate, Employment Rate, and Underemployment Rate. 1.1.1 Independent Variable According to the OECD, FDIs refer to cross-border investments made by an investor in one country, and such investors establish a degree of interest and influence over an investee enterprise in another country. 1.1.2 Dependent Variables The Labor Force Participation Rate represents the proportion of people within the working age group who are actively engaged in the labor market. The labor force includes both those seeking work and those counted as unemployed and all employed people. The LFP rate is an important economic indicator since it represents the amount of labor in the economy, which influences GDP. Employment Rate pertains to the number of people with a job as a percentage of the labor force. The employment rate in the Philippines is a crucial indicator of the country's economic health and labor market conditions. Unemployment is described as the state of not having a job for some people who can and want to work but cannot find a job (Mehmet Mucuk & M. Tahir Demirsel, 2023). It is one of the most significant problems the Philippines is currently facing. The International Labor Organization (2022) states that an economy's unemployment rate reflects its failure to provide employment opportunities to those willing and able to work but cannot find jobs despite actively searching and being qualified. This situation persists even when these individuals are prepared and eager to work. Therefore, the unemployment rate measures the labor market's condition and a nation's ability to effectively and efficiently employ its labor force. Underemployment encompasses not just being jobless and seeking employment but also extends to individuals who have stopped searching for jobs, part-time employees who cannot secure full-time positions, and those earning low wages (Jensen & Slack, 2003 ). It refers to the situation where an individual is working in a position that falls short of specific criteria and is associated with various adverse effects for workers (Mckee-Ryan & Harvey, 2011 ). Consequently, upon the preceding discussion regarding the impact of FDIs on the labor market indicators in the Philippines, the study formulates the hypothesis Hₒ: Foreign Direct Investments in the Philippines impact the labor market indicators in the Philippines. 2. Data and Methodology This study employed a quantitative research design to examine the financial implications of foreign direct investments (FDIs) on employment rates, unemployment, and underemployment in the Philippines from 1991 to 2022. According to Babbie ( 2014 ), the quantitative method gathered numerical data across more significant subjects to provide a more accurate and objective result. The study used the Granger causality to investigate whether FDIs impacted labor market indicators from 1991 until 2022. Readily available secondary documents and records from reputable online sources were used as data sources. These employment rates are gathered from the Philippine Statistics Authority, the recognized authority of the Republic of the Philippines, regarding key labor and employment indicators. Further, data on the level of FDIs in the Philippines were sourced from the World Bank, a reputable global economic and financial data source. After gathering the data, stationarity and differencing process is conducted prior to running a Granger causality test. One of the assumptions of Granger causality is that the x and y time series are stationary. If that is not the case, differencing must first be employed before using the Granger causality test. The research applied a Granger Causality Model to analyze time series data made stationary. The Granger causality test, used to ascertain if one time series can predict another, is a statistical method for hypothesis testing. Time series analysis often asks if one economic indicator (like FDIs) can predict another (such as employment growth). Granger, in 1969, introduced a test for this purpose, which was later popularized by Sims in 1972. This test uses F- tests to determine if past values of a variable Y significantly inform about the future values of a variable X, considering past values of X. If they do not. It is said that "Y does not Granger-cause X." The Granger causality test will be applied to assess the influence among the variables. By employing a bivariate vector autoregression model with an autoregressive lag length (p), and estimating the subsequent unrestricted equation through ordinary least squares (OLS), it is proposed that the chosen number of lags (p) could validate the effect of the variables on each other. Finally, the Granger causality test results were available, and their interpretation was provided. 3. Results Data were gathered from the Philippine Statistics Authority (PSA) on employment rates and the World Bank on FDIs in the Philippines. Utilizing the Granger causality test to analyze the impact of FDI on labor market indicators over a time series in the Philippines revealed significant findings. Table 1. Impact of FDIs on Employment Rate Initially, the first lag did not show a significant effect, but as more observations were considered, FDI began to exhibit a growing influence on employment rates. The FDI and employment rate time series were stationary before the Granger Causality test was conducted. Stationarity was achieved through differencing, with a resulting p-value of 0.010 after two differencing steps. Subsequently, the Granger Causality test demonstrated that while the p-value for the first lag was insignificant (0.0979), indicating no immediate effect, subsequent observations showed p-values below 0.05, signifying a substantial impact of FDI on employment rates. The rise of foreign direct investment (FDI) in the Philippines from 1991 to 2022 significantly impacted employment rates. This growth likely spurred job creation through new foreign businesses and the expansion of domestic firms in the supply chain. In addition, foreign direct investment introduced new technologies and expertise, leading to skills development for Filipino workers and potentially boosting productivity, which often leads to the need for more employees. In addition, foreign companies offering competitive wages could force local businesses to increase wages, benefiting a wider range of workers. Foreign Direct Investment had a significant impact on the employment rate in the Philippines from 1991 to 2022, and the overall effect on the Philippines during this period was positive. The results confirm that FDIs have a significant impact on employment rates. These results align with previous studies by Li & Liu (2005), confirming a significant and statistically meaningful effect of FDI on both economic growth and employment. FDI was found to stimulate industrial expansion, leading to increased job opportunities, contributing to economic growth, fostering favorable conditions for job creation, enhancing productivity resulting in more efficient labor use, and creating linkages that boost employment prospects. T able 2. Impact of FDIs to Unemployment Rate The impact of Foreign Direct Investment (FDI) on the unemployment rate in the Philippines varies over time. Initially, FDI is found to Granger-cause the unemployment rate in the first lag, indicating a significant impact. However, as time progresses, this significance diminishes, with no significant impact observed in subsequent lags. This shows that FDI does not Granger-cause the unemployment rate, highlighting a complex relationship between these variables. While it may appear that FDI did not have a significant impact on the unemployment rate in the Philippines (1991-2022). There may be a few reasons for this. First, the creation of jobs from foreign direct investment (FDI) through new businesses and supply chains could take a long time to fully affect unemployment. It is possible that the Granger Causality Test used in the present study may have missed this delayed effect. Second, a skills gap between unemployed Filipinos and jobs created by foreign direct investment (FDI) can prevent immediate unemployment reduction. Thirdly, job displacement due to FDI in certain sectors can offset the positive effects. In addition, it is possible that the study focused on increasing employment rates, which could coexist with a stable or even slightly increasing unemployment rate if more people enter the labor market. In conclusion, the Granger Causality Test itself has certain limitations. Therefore, the lack of a clear impact does not mean that FDI is irrelevant. The positive effects may have been delayed, masked by other factors. The findings are consistent with prior research such as Strat et al. (2015), Malik (2019), and Mkomber et al. (2020), which also reported a lack of significant effects from FDI inflows on joblessness. Further research by Yilmaz Bayar and Mahmut Unsal Sasmaz (2017) corroborates these outcomes, showing inconsistent effects of FDI inflows on unemployment levels. Similarly, Sabado et al. (2023) found that FDI indirectly contributed to lowering unemployment rates, as evidenced by OLS regression analysis. In summary, the data suggests that FDI may initially influence unemployment rates significantly, but this influence tends to wane over time. It is imperative for policymakers to delve deeper into this dynamic to craft more targeted policies and strategies that effectively tackle unemployment in the Philippines, taking into account the complex ways FDI affects the job market. T able 3. Impact of FDIs to Underemployment Rate The study examining the link between Foreign Direct Investment (FDI) and the level of underemployment in the Philippines from 1991 to 2022 found no evidence that FDI influences underemployment rates. According to the Granger causality test, all lagged results of the underemployment rate had p-values above 0.05, suggesting that FDI had no notable effect on underemployment during this period. To ensure data stability, two steps of differencing were performed. The initial differencing indicated a p-value of 0.055, which implies the data was not stationary. However, after the second differencing, the p-value dropped to 0.025, leading to the conclusion that the data was indeed stationary. Although FDI seemed to boost overall employment in the Philippines (1991-2022), it might not have significantly affected underemployment for a few reasons. First of all, the skills needed by FDI ventures may not match the skills of underemployed Filipinos who are stuck in part-time or low-paying informal jobs. Second, new FDI jobs could lack upward mobility and could not attract underemployed people looking for better opportunities. Thirdly, in the informal sector, where underemployment is high, the spillover effects of foreign direct investment (FDI), which focuses primarily on the formal sector, could not be very beneficial. Finally, the study could have focused on the number of jobs created, neglecting the quality and the extent to which underemployment (working below the skill level or insufficient hours) is addressed. However, the lack of a clear impact does not mean that FDI is irrelevant. The positive impact on underemployment may be delayed or the data may not fully capture the informal sector. It is also important to take into account alternative explanations, such as a time lag for positive impacts or limitations in underemployment data. In order to effectively deal with underemployment, policies in conjunction with FDI focusing on skills development, formalizing the informal sector and ensuring decent working conditions in FDI jobs may be necessary. The study's results align with Terutomo Ozawa (1992), indicating that an increase in labor-seeking Foreign Direct Investment (FDI) swiftly reduces unemployment, while no significant impact on underemployment is observed. However, these observations highlight the complexity of the relationship between FDI and underemployment, suggesting that the influx of foreign investment may not have a substantial effect on addressing the challenges associated with insufficient work opportunities and found no significant impact or causal effect of FDI on Underemployment. T able 4. Impact of FDIs to Labor Force Participation Rate Regarding the Labor Force Participation Rate, it is evident that Foreign Direct Investment is said to Granger-cause Labor Force Participation Rate. The data underwent differencing steps to establish a stationary null hypothesis, with the second differencing resulting in a p-value of 0.019, leading to the rejection of the non-stationary hypothesis. Initially, no significant effect was observed in the first and second lag of FDI on the Labor Force Participation Rate. However, subsequent observations showed a significant impact, particularly in the long run, with p-values for the third, fourth, and fifth lags indicating a substantial influence. Moreover, a Granger causality test was conducted to determine the impact of FDI on the Labor Force Participation Rate. While the p-values for the first and second lags were not significant (0.2185 and 0.4011, respectively), subsequent observations revealed significant impacts in later lags, indicating a long-term influence of FDI on labor force participation. The influx of FDI is often associated with economic growth and increased employment opportunities, leading to a higher labor force participation rate. FDI can stimulate innovation, drive firm turnover, and contribute to overall economic expansion, all of which can positively impact the labor market. Additional supporting studies by Saurav et al. (2020) that explore similar relationships between FDI and employment effects in various countries like Vietnam, Central and Eastern European countries, China, Indonesia, and more, provides how FDI influences job creation, wages, skill demand, wage inequality, and other economic factors. The rise of foreign direct investment (FDI) in the Philippines (1991–2022) likely had a complex impact on labor force participation. More job opportunities, potentially due to new businesses and the expansion of the supply chain through FDI, could attract more people, in particular those who have not previously sought work, to enter the labor market. In addition, competition from foreign companies could lead to higher wages, increase the financial attractiveness of work and encourage more people to take part. The opportunities to develop skills associated with FDI could also make work more accessible to those who have previously lacked qualifications. However, skills mismatches between jobs created and skills of the workforce, as well as the persistence of a large informal sector in which many Filipinos work but are not officially counted, could limit the overall impact of FDI on participation rates. In essence, FDI is likely to have a mixed effect, potentially increasing participation for some, but not everyone, due to skills gaps and the informal sector. In conclusion, the results underscores the significant impact of FDI on the Labor Force Participation Rate in the Philippines over time and highlights how FDI plays a crucial role in shaping employment opportunities and economic growth. T able 5. Summary of Tables 1-4 Table 5 presents the summary of results of the Granger Causality Test, revealing significant insights into the relationship between foreign direct investment (FDI) and labor market indicators in the Philippines. The findings indicate a causality between foreign direct investment (FDI) and labor force participation and employment rates, suggesting that an increase in foreign investment positively influences these aspects of the labor market. As FDI flows into the country, it can lead to a higher level of labor participation and employment, which contributes to economic growth and job creation. However, the absence of a significant causal effect of foreign direct investment (FDI) on unemployment and underemployment rates highlights the complex nature of the impact of FDI on different aspects of the labor market, indicating that while FDI may increase participation and employment, it may not directly address unemployment and underemployment problems. Moreover, the mixed effects of FDI on labor market participation underscore the importance of considering various factors such as skills mismatches and the presence of the informal sector. While FDI can attract more individuals to enter the labor market through job opportunities and potentially higher wages, challenges such as skills gaps and informal employment may limit the overall impact on participation rates. This complexity highlights the need for targeted policies and interventions to maximize the positive effects of foreign direct investment (FDI) on labor market indicators, ensuring sustainable employment growth and economic development of the Philippines. By understanding the causal relationships identified in Table 5, policymakers can tailor strategies to exploit FDI’s potential to foster a more robust and inclusive labor market that benefits all segments of society. 4. Conclusion This study focused on “The Impact of Foreign Direct Investments on Labor Market Indicators in the Philippines using Granger Causality,” which shows different economic policies, foreign investment, and labor market dynamics. In addition to the statistical findings, this study shows that employment growth is complex and depends on many factors, including skills gaps, inclusive job creation, and sustainable economic development. By considering the nuanced effects of foreign direct investment (FDI) on labor force participation and unemployment rates, policymakers can adapt strategies to exploit the potential benefits of FDI while mitigating any adverse consequences, such as job displacement or informal sector challenges. In addition, this research calls for stakeholders to take a holistic approach to improving the quality of employment opportunities, ensuring equal access to employment, and promoting long-term economic resilience. By integrating this study’s insights into policy formulation and implementation, the Philippines can strive toward a more robust and inclusive labor market that not only responds to the immediate impacts of foreign direct investment but also lays the foundation for sustainable growth and prosperity for all segments of society. Ultimately, this research contributes to the ongoing dialog on the role of foreign direct investment (FDI) in shaping labor market outcomes and underscores the imperative of proactive and strategic decision-making to maximize the positive impacts of FDI on employment and economic well- being in the Philippines. This study has some limitations that should be acknowledged. Firstly, the study does not account for the possible endogeneity and reverse causality between FDI and employment. Secondly, the study does not differentiate between the types, sources, and sectors of FDI, which may have different effects on employment. 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Interconnected economies: Benefiting from global value chains. https://www.oecd- ilibrary.org/sites/9789264189560-sum-en/index.html?itemId=/content/component/9789264189560-sum-en Sabado, J. R. F. ., Millan, K. A., & Asoy, D. M. . (2023). The Relationship of Foreign Direct Investment and Unemployment Rate in the Philippines. Journal of Asian Development , 9(1),32–52. https://doi.org/10.52941/jad.v9i1.44 Saurav et al. (2020). Foreign Direct Investment and Employment Outcomesin Developing Countries. Retrieved from https://documents1.worldbank.org/curated/en/956231593150550672/pdf/Foreign-Direct- Investment-and-Employment-Outcomes-in-Developing-Countries-A-Literature-Review-of-the- Effects-of-FDI-on-Job-Creation-and-Wages.pdf Setyanti, A. M. and Wahyudi, S. T. (2021). Foreign direct investment and youth employment causality: evidence from asean-5 countries. Jurnal Economia , 17(2), 208-219. https://doi.org/10.21831/economia.v17i2.36447 Sharmistha, S., Roy, A. K., & Mukherjee, M. (2019). Foreign direct investment and employment growth in ASEAN countries: A panel data analysis. Journal of Asian Economic Studies , 28(3), Strat et al. (2015), Malik (2019), and Mkombe et al. (2020).The Relationship of Foreign Direct Investment and Unemployment Rate in the Philippines. https://journalpro.org/index.php/jad/article/download/44/41/89 Sugui, J. A. M., Montojo, P. M. N., & Bermudez, A. C. P. (2023). The Impact of Foreign Direct Investment, Inflation, Labor Force, and Population on Improving Living Standards in the Philippines. Journal of Economics, Finance and Accounting Studies , 5(3), 65–86. https://doi.org/10.32996/jefas.2023.5.3.6 Terutomo Ozawa (1992). Foreign direct investment and economic development. https://www.researchgate.net/profile/TerutomoOzawa/publication/267223820_Foreign_Direct_Investment_and_Economic_Development/links /57d8cc7708ae6399a3993198/Foreign-Direct-Investment-and-Economic-Development.pdf Valenton, K. J. and Garcia V. F. (2022). Foreign Direct Investments and Market Competition in the Philippines. https://ssrn.com/abstract=4127559 or http://dx.doi.org/10.2139/ssrn.4127559 View of The Relationship of Foreign Direct Investment and Unemployment Rate in the Philippines . (n.d.). https://www.journalpro.org/index.php/jad/article/view/44/4 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. 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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-6291054","acceptedTermsAndConditions":true,"allowDirectSubmit":true,"archivedVersions":[],"articleType":"Research Article","associatedPublications":[],"authors":[{"id":432868900,"identity":"0addcbf4-521a-4420-9c9c-fb69b5117c81","order_by":0,"name":"Janine Leah Maquilan","email":"","orcid":"","institution":"University of San Jose–Recoletos","correspondingAuthor":false,"prefix":"","firstName":"Janine","middleName":"Leah","lastName":"Maquilan","suffix":""},{"id":432868901,"identity":"8d606616-fb8f-4597-ae01-1a093d28f5dd","order_by":1,"name":"Ashley Conception","email":"","orcid":"","institution":"University of San Jose–Recoletos","correspondingAuthor":false,"prefix":"","firstName":"Ashley","middleName":"","lastName":"Conception","suffix":""},{"id":432868902,"identity":"39b2ca18-3e14-430d-bea2-24c7815e65a6","order_by":2,"name":"Freshcykate Colongon","email":"","orcid":"","institution":"University of San Jose–Recoletos","correspondingAuthor":false,"prefix":"","firstName":"Freshcykate","middleName":"","lastName":"Colongon","suffix":""},{"id":432868903,"identity":"54e3afd3-f52e-41ae-a7c3-205a9b3f3b11","order_by":3,"name":"Neil Matthew Adolfo","email":"","orcid":"","institution":"University of San Jose–Recoletos","correspondingAuthor":false,"prefix":"","firstName":"Neil","middleName":"Matthew","lastName":"Adolfo","suffix":""},{"id":432868904,"identity":"a9a1f6cb-21b2-4e12-b1d1-98d592763485","order_by":4,"name":"Quencel Caparida","email":"","orcid":"","institution":"University of San Jose–Recoletos","correspondingAuthor":false,"prefix":"","firstName":"Quencel","middleName":"","lastName":"Caparida","suffix":""},{"id":432868905,"identity":"53d925f4-4b9a-4853-89f1-6bbf77f5f3af","order_by":5,"name":"Joey Jamero","email":"","orcid":"","institution":"University of San Jose–Recoletos","correspondingAuthor":false,"prefix":"","firstName":"Joey","middleName":"","lastName":"Jamero","suffix":""},{"id":432868906,"identity":"f03c09ce-067a-4c04-a573-e97997e5a553","order_by":6,"name":"Joey Estorosos","email":"data:image/png;base64,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","orcid":"","institution":"University of San Jose–Recoletos","correspondingAuthor":true,"prefix":"","firstName":"Joey","middleName":"","lastName":"Estorosos","suffix":""}],"badges":[],"createdAt":"2025-03-24 02:53:22","currentVersionCode":1,"declarations":"","doi":"10.21203/rs.3.rs-6291054/v1","doiUrl":"https://doi.org/10.21203/rs.3.rs-6291054/v1","draftVersion":[],"editorialEvents":[],"editorialNote":"","failedWorkflow":false,"files":[{"id":79150533,"identity":"049142a3-8689-496b-aa06-38588bc327f9","added_by":"auto","created_at":"2025-03-25 04:23:49","extension":"png","order_by":1,"title":"Figure 1","display":"","copyAsset":false,"role":"figure","size":92418,"visible":true,"origin":"","legend":"\u003cp\u003e\u003cstrong\u003eConceptual Framework\u003c/strong\u003e\u003c/p\u003e","description":"","filename":"1.png","url":"https://assets-eu.researchsquare.com/files/rs-6291054/v1/475e954ec0081f93db24d73e.png"},{"id":80643581,"identity":"0dfe3b0a-9806-4708-b801-8d120ee8960a","added_by":"auto","created_at":"2025-04-15 13:38:59","extension":"pdf","order_by":0,"title":"","display":"","copyAsset":false,"role":"manuscript-pdf","size":797159,"visible":true,"origin":"","legend":"","description":"","filename":"manuscript.pdf","url":"https://assets-eu.researchsquare.com/files/rs-6291054/v1/f3c1d39d-fdcc-4ad5-9e05-f1ef20cffa9e.pdf"}],"financialInterests":"No competing interests reported.","formattedTitle":"The Impact of Foreign Direct Investments on Labor Market Indicators of the Philippines using the Granger Causality","fulltext":[{"header":"1. Introduction","content":"\u003cp\u003eLabor market indicators are essential tools that provide insight into a country's economic health by tracking employment trends, wage changes, and other vital metrics. In the context of the Philippines, the Philippine Statistics Authority (PSA) provides these insights through its Key Labor and Employment Indicators, which include the employment rate, labor force participation rate, under-employment rate, and unemployment rate. For instance, the employment rate, which measures the percentage of the employed working-age population, stood at 95.2% in July 2023. This figure represents a slight increase from July 2022's 94.8% but a marginal decrease from June 2023's 95.5%. The labor force participation rate, indicating the share of the population working or actively looking for work, was recorded at 60.1% in July 2023, a decrease from the previous year's 65.2% and June 2023's 66.17%. The under-employment rate, which accounts for those working less than 40 hours a week, rose to 15.9% in July 2023, up from 13.8% in July 2022 and 12.0% in June 2023. Lastly, the unemployment rate, reflecting the percentage of the jobless labor force, was at 4.8% in July 2023, down from 5.2% in July 2022 but up from 4.5% in June 2023. These figures collectively suggest that the Philippines maintains a relatively high employment rate, indicating a robust labor market.\u003c/p\u003e \u003cp\u003eSharmistha et al. (\u003cspan citationid=\"CR27\" class=\"CitationRef\"\u003e2019\u003c/span\u003e) assert that Foreign Direct Investment (FDI) significantly and positively influences job creation, thereby boosting employment growth. FDIs are investments from one country to another, where the investor gains substantial interest and influence in a foreign enterprise (OECD, n.d.). Sharmistha et al. (\u003cspan citationid=\"CR27\" class=\"CitationRef\"\u003e2019\u003c/span\u003e) found this impact particularly strong in East and South Asia and, to a lesser degree, in Latin America. Mpanju (\u003cspan citationid=\"CR19\" class=\"CitationRef\"\u003e2012\u003c/span\u003e) observed similar effects in Tanzania, with FDI contributing to job creation, technology transfer, and managerial expertise. Research in six Middle Eastern and North African nations\u0026mdash;Egypt, Jordan, Lebanon, Morocco, Tunisia, and Turkey\u0026mdash;indicates that FDI lowers unemployment rates (Alawneh and Nessa, 2020). Tang and Kwan (\u003cspan citationid=\"CR14\" class=\"CitationRef\"\u003e2020\u003c/span\u003e) note the beneficial impact of foreign investment on employment across various industries in Malaysia. In Vietnam, FDI firms have outpaced domestic companies in generating jobs, with positive employment spillovers to the local sector (Dao et al., \u003cspan citationid=\"CR7\" class=\"CitationRef\"\u003e2023\u003c/span\u003e). However, Sharmistha et al. (\u003cspan citationid=\"CR27\" class=\"CitationRef\"\u003e2019\u003c/span\u003e) also observed that this trend is reversed in Sub-Saharan Africa, the Middle East and North Africa, suggesting a significant regional variation. In India, while job creation is evident, FDI is not considered a significant contributor to this trend (Mishra \u0026amp; Palit, \u003cspan citationid=\"CR18\" class=\"CitationRef\"\u003e2020\u003c/span\u003e). Lastly, Jude and Silaghi (\u003cspan citationid=\"CR13\" class=\"CitationRef\"\u003e2016\u003c/span\u003e) found that in the EU, FDI can lead to 'creative destruction' in the job market, potentially displacing existing employment.\u003c/p\u003e \u003cp\u003eDue to the varying results of existing studies in other countries and regions, this study aims to examine the impact of FDIs on employment growth in the Philippines on a time series analysis. According to the World Bank, the Philippines has had an average total FDI of US\u003cspan\u003e$\u003c/span\u003e9.3\u0026nbsp;Billion for the past five years. In 2022 alone, the Philippines accumulated US\u003cspan\u003e$\u003c/span\u003e9.2\u0026nbsp;Billion in FDIs. The data provided show the immense number of FDIs in the Philippines. Nonetheless, Valenton and Garcia-Vigonti (2022) point out that the Philippines faces certain obstacles that limit FDI, such as the Foreign Investment Act (R.A. 7042, 1991, amended by R.A. 8179, 1996), which requires a minimum of 60% Filipino ownership in businesses, with the rest open to foreign investors. Despite these limitations, FDIs have the potential to significantly influence employment opportunities and growth in the Philippines over time.\u003c/p\u003e \u003cp\u003eAccording to the study of Agbola, F. W. (2009) suggests that foreign direct investment. (FDI) is a precursor to economic growth in the Philippines. Similarly, Sugui et al. (\u003cspan citationid=\"CR29\" class=\"CitationRef\"\u003e2023\u003c/span\u003e) found that factors such as inflation, labor force, and population size are determinants of living standards in the Philippines, with FDI not playing a role. Masipa Tshepo's (2014) findings also support the notion that FDI leads to increases in GDP and employment, with evidence of a positive correlation between these variables in South Africa from 1990 to 2013. In India, G. Goenka (\u003cspan citationid=\"CR10\" class=\"CitationRef\"\u003e2013\u003c/span\u003e) discovered that FDI influences GDP in the short term and employment in the long term. Conversely, Campos \u0026amp; Kinoshita (\u003cspan citationid=\"CR5\" class=\"CitationRef\"\u003e2002\u003c/span\u003e) observed that FDI might have a negligible or even negative effect on job growth in Eastern European and Baltic nations. Lastly, a study by Addo Eric Osei (2019) in Ghana indicated no causal link between FDI and employment growth during 2000\u0026ndash;2016.\u003c/p\u003e \u003cp\u003eMuch of the literature available has focused on economic growth, including employment, but not on employment growth alone. However, a study by Setyanti and Wahyudi (\u003cspan citationid=\"CR26\" class=\"CitationRef\"\u003e2021\u003c/span\u003e), using the Granger causality between FDI and youth employment, noted that in Indonesia, Malaysia, the Philippines, and Singapore, the FDI inflow leads to youth employment, while the relationship in Thailand is vice versa. While the study of Setyanti and Wahyudi (\u003cspan citationid=\"CR26\" class=\"CitationRef\"\u003e2021\u003c/span\u003e) on the Granger causality between FDI and employment growth in ASEAN countries, including the Philippines, the study focuses on youth employment for individuals joining the labor force at the age of 15\u0026ndash;24. The study only posits that FDIs impact youth employment rather than the employment of the labor force in general. In the Philippines, the labor force covers 15 years old and above. As FDIs are not solely beneficial to youth employment, this study looks at the impact of FDIs on various labor market indicators beyond youth employment, contributing to a more nuanced understanding of FDI's role in shaping the Philippine labor market.\u003c/p\u003e \u003cdiv id=\"Sec2\" class=\"Section2\"\u003e \u003ch2\u003e1.1 Conceptual Framework\u003c/h2\u003e \u003cp\u003eThis study is based on the Global Value Chain Theory, which suggests that Foreign Direct Investment (FDI) can boost job creation, yet it may also result in the loss of existing jobs. As global value chains (GVCs) expand, countries become more interlinked and focus on particular tasks and segments within value chains, moving away from broad industry specializations (OECD, \u003cspan citationid=\"CR23\" class=\"CitationRef\"\u003e2013\u003c/span\u003e).\u003c/p\u003e \u003cp\u003eJude and Silaghi (\u003cspan citationid=\"CR13\" class=\"CitationRef\"\u003e2016\u003c/span\u003e) highlight the significant impact foreign investors have on job creation in a country via various mechanisms. They suggest that Foreign Direct Investment (FDI) in the Philippines is a key driver for engaging the workforce and influencing employment and unemployment statistics. These statistics reflect the proportion of the population that is either jobless or working. While FDI is generally anticipated to boost job opportunities and have a favorable effect on employment, there are instances where it might result in job loss, as noted by Hale and Xu (2016).\u003c/p\u003e \u003cp\u003e \u003c/p\u003e \u003cp\u003eThe conceptual framework shown in Fig.\u0026nbsp;\u003cspan refid=\"Fig1\" class=\"InternalRef\"\u003e1\u003c/span\u003e illustrates the variables that would be considered. This study identifies the Philippines' Foreign Direct Investment (FDI) as the independent variable, suggesting that FDI may influence the nation's employment figures (Nawas, 2024). The dependent variables relate to the Philippines' employment rates, part of the Labor Force Framework. This includes the Labor Force Participation Rate, Unemployment Rate, Employment Rate, and Underemployment Rate.\u003c/p\u003e \u003cdiv id=\"Sec3\" class=\"Section3\"\u003e \u003ch2\u003e1.1.1 Independent Variable\u003c/h2\u003e \u003cp\u003eAccording to the OECD, FDIs refer to cross-border investments made by an investor in one country, and such investors establish a degree of interest and influence over an investee enterprise in another country.\u003c/p\u003e \u003c/div\u003e \u003cdiv id=\"Sec4\" class=\"Section3\"\u003e \u003ch2\u003e1.1.2 Dependent Variables\u003c/h2\u003e \u003cp\u003eThe Labor Force Participation Rate represents the proportion of people within the working age group who are actively engaged in the labor market. The labor force includes both those seeking work and those counted as unemployed and all employed people. The LFP rate is an important economic indicator since it represents the amount of labor in the economy, which influences GDP.\u003c/p\u003e \u003cp\u003eEmployment Rate pertains to the number of people with a job as a percentage of the labor force. The employment rate in the Philippines is a crucial indicator of the country's economic health and labor market conditions.\u003c/p\u003e \u003cp\u003eUnemployment is described as the state of not having a job for some people who can and want to work but cannot find a job (Mehmet Mucuk \u0026amp; M. Tahir Demirsel, 2023). It is one of the most significant problems the Philippines is currently facing.\u003c/p\u003e \u003cp\u003eThe International Labor Organization (2022) states that an economy's unemployment rate reflects its failure to provide employment opportunities to those willing and able to work but cannot find jobs despite actively searching and being qualified. This situation persists even when these individuals are prepared and eager to work. Therefore, the unemployment rate measures the labor market's condition and a nation's ability to effectively and efficiently employ its labor force.\u003c/p\u003e \u003cp\u003eUnderemployment encompasses not just being jobless and seeking employment but also extends to individuals who have stopped searching for jobs, part-time employees who cannot secure full-time positions, and those earning low wages (Jensen \u0026amp; Slack, \u003cspan citationid=\"CR12\" class=\"CitationRef\"\u003e2003\u003c/span\u003e). It refers to the situation where an individual is working in a position that falls short of specific criteria and is associated with various adverse effects for workers (Mckee-Ryan \u0026amp; Harvey, \u003cspan citationid=\"CR16\" class=\"CitationRef\"\u003e2011\u003c/span\u003e).\u003c/p\u003e \u003cp\u003eConsequently, upon the preceding discussion regarding the impact of FDIs on the labor market indicators in the Philippines, the study formulates the hypothesis\u003c/p\u003e \u003cp\u003eHₒ: Foreign Direct Investments in the Philippines impact the labor market indicators in the Philippines.\u003c/p\u003e \u003c/div\u003e \u003c/div\u003e"},{"header":"2. Data and Methodology","content":"\u003cp\u003eThis study employed a quantitative research design to examine the financial implications of foreign direct investments (FDIs) on employment rates, unemployment, and underemployment in the Philippines from 1991 to 2022. According to Babbie (\u003cspan citationid=\"CR3\" class=\"CitationRef\"\u003e2014\u003c/span\u003e), the quantitative method gathered numerical data across more significant subjects to provide a more accurate and objective result.\u003c/p\u003e \u003cp\u003eThe study used the Granger causality to investigate whether FDIs impacted labor market indicators from 1991 until 2022. Readily available secondary documents and records from reputable online sources were used as data sources. These employment rates are gathered from the Philippine Statistics Authority, the recognized authority of the Republic of the Philippines, regarding key labor and employment indicators. Further, data on the level of FDIs in the Philippines were sourced from the World Bank, a reputable global economic and financial data source.\u003c/p\u003e \u003cp\u003eAfter gathering the data, stationarity and differencing process is conducted prior to running a Granger causality test. One of the assumptions of Granger causality is that the x and y time series are stationary. If that is not the case, differencing must first be employed before using the Granger causality test.\u003c/p\u003e \u003cp\u003eThe research applied a Granger Causality Model to analyze time series data made stationary. The Granger causality test, used to ascertain if one time series can predict another, is a statistical method for hypothesis testing. Time series analysis often asks if one economic indicator (like FDIs) can predict another (such as employment growth). Granger, in 1969, introduced a test for this purpose, which was later popularized by Sims in 1972. This test uses F- tests to determine if past values of a variable Y significantly inform about the future values of a variable X, considering past values of X. If they do not. It is said that \"Y does not Granger-cause X.\"\u003c/p\u003e \u003cp\u003eThe Granger causality test will be applied to assess the influence among the variables. By employing a bivariate vector autoregression model with an autoregressive lag length (p), and estimating the subsequent unrestricted equation through ordinary least squares (OLS), it is proposed that the chosen number of lags (p) could validate the effect of the variables on each other.\u003c/p\u003e \u003cp\u003eFinally, the Granger causality test results were available, and their interpretation was provided.\u003c/p\u003e"},{"header":"3. Results","content":"\u003cp\u003eData were gathered from the Philippine Statistics Authority (PSA) on employment rates and the World Bank on FDIs in the Philippines. Utilizing the Granger causality test to analyze the impact of FDI on labor market indicators over a time series in the Philippines revealed significant findings. \u0026nbsp;\u003c/p\u003e\n\u003cp\u003eTable 1. Impact of FDIs on Employment Rate\u003c/p\u003e\n\u003cp\u003e\u003cimg width=\"525\" 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alt=\"image\" height=\"78\"\u003e\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eInitially, the first lag did not show a significant effect, but as more observations were considered, FDI began to exhibit a growing influence on employment rates. The FDI and employment rate time series were stationary before the Granger Causality test was conducted. Stationarity was achieved through differencing, with a resulting p-value of 0.010 after two differencing steps. Subsequently, the Granger Causality test demonstrated that while the p-value for the first lag was insignificant (0.0979), indicating no immediate effect, subsequent observations showed p-values below 0.05, signifying a substantial impact of FDI on employment rates.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e\u0026nbsp;\u003c/strong\u003eThe rise of foreign direct investment (FDI) in the Philippines from 1991 to 2022 significantly impacted employment rates. This growth likely spurred job creation through new foreign businesses and the expansion of domestic firms in the supply chain. In addition, foreign direct investment introduced new technologies and expertise, leading to skills development for Filipino workers and potentially boosting productivity, which often leads to the need for more employees. In addition, foreign companies offering competitive wages could force local businesses to increase wages, benefiting a wider range of workers. Foreign Direct Investment had a significant impact on the employment rate in the Philippines from 1991 to 2022, and the overall effect on the Philippines during this period was positive.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e\u0026nbsp;\u003c/strong\u003eThe results confirm that FDIs have a significant impact on employment rates. These results align with previous studies by Li \u0026amp; Liu (2005), confirming a significant and statistically meaningful effect of FDI on both economic growth and employment. FDI was found to stimulate industrial expansion, leading to increased job opportunities, contributing to economic growth, fostering favorable conditions for job creation, enhancing productivity resulting in more efficient labor use, and creating linkages that boost employment prospects.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eT\u003c/strong\u003e\u003cstrong\u003eable 2. Impact of FDIs to Unemployment Rate\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003e\u003cimg width=\"518\" 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\" alt=\"image\" height=\"77\"\u003e\u003c/p\u003e\n\u003cp\u003eThe impact of Foreign Direct Investment (FDI) on the unemployment rate in the Philippines varies over time. Initially, FDI is found to Granger-cause the unemployment rate in the first lag, indicating a significant impact. However, as time progresses, this significance diminishes, with no significant impact observed in subsequent lags. This shows that FDI does not Granger-cause the unemployment rate, highlighting a complex relationship between these variables.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eWhile it may appear that FDI did not have a significant impact on the unemployment rate in the Philippines (1991-2022). There may be a few reasons for this. First, the creation of jobs from foreign direct investment (FDI) through new businesses and supply chains could take a long time to fully affect unemployment. It is possible that the Granger Causality Test used in the present study may have missed this delayed effect. Second, a skills gap between unemployed Filipinos and jobs created by foreign direct investment (FDI) can prevent immediate unemployment reduction. Thirdly, job displacement due to FDI in certain sectors can offset the positive effects. In addition, it is possible that the study focused on increasing employment rates, which could coexist with a stable or even slightly increasing unemployment rate if more people enter the labor market. In conclusion, the Granger Causality Test itself has certain limitations. Therefore, the lack of a clear impact does not mean that FDI is irrelevant. The positive effects may have been delayed, masked by other factors.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eThe findings are consistent with prior research such as Strat et al. (2015), Malik (2019), and Mkomber et al. (2020), which also reported a lack of significant effects from FDI inflows on joblessness. Further research by Yilmaz Bayar and Mahmut Unsal Sasmaz (2017) corroborates these outcomes, showing inconsistent effects of FDI inflows on unemployment levels. Similarly, Sabado et al. (2023) found that FDI indirectly contributed to lowering unemployment rates, as evidenced by OLS regression analysis. In summary, the data suggests that FDI may initially influence unemployment rates significantly, but this influence tends to wane over time. It is imperative for policymakers to delve deeper into this dynamic to craft more targeted policies and strategies that effectively tackle unemployment in the Philippines, taking into account the complex ways FDI affects the job market.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eT\u003c/strong\u003e\u003cstrong\u003eable 3. Impact of FDIs to Underemployment Rate\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003e\u003cimg width=\"513\" 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alt=\"image\" height=\"76\"\u003e\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eThe study examining the link between Foreign Direct Investment (FDI) and the level of underemployment in the Philippines from 1991 to 2022 found no evidence that FDI influences underemployment rates. According to the Granger causality test, all lagged results of the underemployment rate had p-values above 0.05, suggesting that FDI had no notable effect on underemployment during this period. To ensure data stability, two steps of differencing were performed. The initial differencing indicated a p-value of 0.055, which implies the data was not stationary. However, after the second differencing, the p-value dropped to 0.025, leading to the conclusion that the data was indeed stationary. \u003cstrong\u003e\u0026nbsp;\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eAlthough FDI seemed to boost overall employment in the Philippines (1991-2022), it might not have significantly affected underemployment for a few reasons. First of all, the skills needed by FDI ventures may not match the skills of underemployed Filipinos who are stuck in part-time or low-paying informal jobs. Second, new FDI jobs could lack upward mobility and could not attract underemployed people looking for better opportunities. Thirdly, in the informal sector, where underemployment is high, the spillover effects of foreign direct investment (FDI), which focuses primarily on the formal sector, could not be very beneficial. Finally, the study could have focused on the number of jobs created, neglecting the quality and the extent to which underemployment (working below the skill level or insufficient hours) is addressed. However, the lack of a clear impact does not mean that FDI is irrelevant. The positive impact on underemployment may be delayed or the data may not fully capture the informal sector. It is also important to take into account alternative explanations, such as a time lag for positive impacts or limitations in underemployment data. In order to effectively deal with underemployment, policies in conjunction with FDI focusing on skills development, formalizing the informal sector and ensuring decent working conditions in FDI jobs may be necessary. \u003cstrong\u003e\u0026nbsp;\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThe study\u0026apos;s results align with Terutomo Ozawa (1992), indicating that an increase in labor-seeking Foreign Direct Investment (FDI) swiftly reduces unemployment, while no significant impact on underemployment is observed. However, these observations highlight the complexity of the relationship between FDI and underemployment, suggesting that the influx of foreign investment may not have a substantial effect on addressing the challenges associated with insufficient work opportunities and found no significant impact or causal effect of FDI on Underemployment. \u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eT\u003c/strong\u003e\u003cstrong\u003eable 4. Impact of FDIs to Labor Force Participation Rate\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003e\u003cimg width=\"521\" 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\" alt=\"image\" height=\"77\"\u003e\u0026nbsp; \u003c/p\u003e\n\u003cp\u003eRegarding the Labor Force Participation Rate, it is evident that Foreign Direct Investment is said to Granger-cause Labor Force Participation Rate. The data underwent differencing steps to establish a stationary null hypothesis, with the second differencing resulting in a p-value of 0.019, leading to the rejection of the non-stationary hypothesis. Initially, no significant effect was observed in the first and second lag of FDI on the Labor Force Participation Rate. However, subsequent observations showed a significant impact, particularly in the long run, with p-values for the third, fourth, and fifth lags indicating a substantial influence.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eMoreover, a Granger causality test was conducted to determine the impact of FDI on the Labor Force Participation Rate. While the p-values for the first and second lags were not significant (0.2185 and 0.4011, respectively), subsequent observations revealed significant impacts in later lags, indicating a long-term influence of FDI on labor force participation. The influx of FDI is often associated with economic growth and increased employment opportunities, leading to a higher labor force participation rate. FDI can stimulate innovation, drive firm turnover, and contribute to overall economic expansion, all of which can positively impact the labor market. Additional supporting studies by Saurav et al. (2020) that explore similar relationships between FDI and employment effects in various countries like Vietnam, Central and Eastern European countries, China, Indonesia, and more, provides how FDI influences job creation, wages, skill demand, wage inequality, and other economic factors. The rise of foreign direct investment (FDI) in the Philippines (1991\u0026ndash;2022) likely had a complex impact on labor force participation. More job opportunities, potentially due to new businesses and the expansion of the supply chain through FDI, could attract more people, in particular those who have not previously sought work, to enter the labor market.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eIn addition, competition from foreign companies could lead to higher wages, increase the financial attractiveness of work and encourage more people to take part. The opportunities to develop skills associated with FDI could also make work more accessible to those who have previously lacked qualifications. However, skills mismatches between jobs created and skills of the workforce, as well as the persistence of a large informal sector in which many Filipinos work but are not officially counted, could limit the overall impact of FDI on participation rates. In essence, FDI is likely to have a mixed effect, potentially increasing participation for some, but not everyone, due to skills gaps and the informal sector. In conclusion, the results underscores the significant impact of FDI on the Labor Force Participation Rate in the Philippines over time and highlights how FDI plays a crucial role in shaping employment opportunities and economic growth.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eT\u003c/strong\u003e\u003cstrong\u003eable 5. Summary of Tables 1-4\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003e\u003cimg width=\"523\" 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\" alt=\"image\" height=\"101\"\u003e\u0026nbsp; \u0026nbsp; \u0026nbsp; \u003c/p\u003e\n\u003cp\u003eTable 5 presents the summary of results of the Granger Causality Test, revealing significant insights into the relationship between foreign direct investment (FDI) and labor market indicators in the Philippines. The findings indicate a causality between foreign direct investment (FDI) and labor force participation and employment rates, suggesting that an increase in foreign investment positively influences these aspects of the labor market. As FDI flows into the country, it can lead to a higher level of labor participation and employment, which contributes to economic growth and job creation. However, the absence of a significant causal effect of foreign direct investment (FDI) on unemployment and underemployment rates highlights the complex nature of the impact of FDI on different aspects of the labor market, indicating that while FDI may increase participation and employment, it may not directly address unemployment and underemployment problems.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eMoreover, the mixed effects of FDI on labor market participation underscore the importance of considering various factors such as skills mismatches and the presence of the informal sector. While FDI can attract more individuals to enter the labor market through job opportunities and potentially higher wages, challenges such as skills gaps and informal employment may limit the overall impact on participation rates. This complexity highlights the need for targeted policies and interventions to maximize the positive effects of foreign direct investment (FDI) on labor market indicators, ensuring sustainable employment growth and economic development of the Philippines. By understanding the causal relationships identified in Table 5, policymakers can tailor strategies to exploit FDI\u0026rsquo;s potential to foster a more robust and inclusive labor market that benefits all segments of society.\u0026nbsp;\u003c/p\u003e"},{"header":"4. Conclusion","content":"\u003cp\u003eThis study focused on \u0026ldquo;The Impact of Foreign Direct Investments on Labor Market Indicators in the Philippines using Granger Causality,\u0026rdquo; which shows different economic policies, foreign investment, and labor market dynamics. In addition to the statistical findings, this study shows that employment growth is complex and depends on many factors, including skills gaps, inclusive job creation, and sustainable economic development. By considering the nuanced effects of foreign direct investment (FDI) on labor force participation and unemployment rates, policymakers can adapt strategies to exploit the potential benefits of FDI while mitigating any adverse consequences, such as job displacement or informal sector challenges.\u003c/p\u003e \u003cp\u003eIn addition, this research calls for stakeholders to take a holistic approach to improving the quality of employment opportunities, ensuring equal access to employment, and promoting long-term economic resilience. By integrating this study\u0026rsquo;s insights into policy formulation and implementation, the Philippines can strive toward a more robust and inclusive labor market that not only responds to the immediate impacts of foreign direct investment but also lays the foundation for sustainable growth and prosperity for all segments of society. Ultimately, this research contributes to the ongoing dialog on the role of foreign direct investment (FDI) in shaping labor market outcomes and underscores the imperative of proactive and strategic decision-making to maximize the positive impacts of FDI on employment and economic well- being in the Philippines.\u003c/p\u003e \u003cp\u003eThis study has some limitations that should be acknowledged. Firstly, the study does not account for the possible endogeneity and reverse causality between FDI and employment. Secondly, the study does not differentiate between the types, sources, and sectors of FDI, which may have different effects on employment. Therefore, future research could use more sophisticated econometric methods, and disaggregate FDI by various dimensions to provide a more comprehensive and nuanced analysis of the relationship and impact of FDI and employment in the Philippines.\u003c/p\u003e"},{"header":"Declarations","content":"\u003ch2\u003eAuthor Contribution\u003c/h2\u003e\u003cp\u003eJ.L.M., A.C., and F.C. wrote the main manuscriptN.M.A. and Q.C. data collection, prepared all the tables, and discussion of findingsJ.J and J.E. overall content, quality, and interpretation of the result\u003c/p\u003e"},{"header":"References","content":"\u003col\u003e\n \u003cli\u003eAddo, E. (2019). An assessment of the impact of foreign direct investment on employment: the case of Ghana\u0026rsquo;s economy. \u003cem\u003eInternational Journal of Economics and Financial Research,\u0026nbsp;\u003c/em\u003e(56), 143-158. https://doi.org/10.32861/ijefr.56.143.158\u0026nbsp;\u003c/li\u003e\n \u003cli\u003eAl alawneh, M. and Nessa, A. 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Foreign Direct Investments and Market Competition in the Philippines. https://ssrn.com/abstract=4127559 or http://dx.doi.org/10.2139/ssrn.4127559 \u003cem\u003eView of The Relationship of Foreign Direct Investment and Unemployment Rate in the Philippines\u003c/em\u003e. (n.d.). https://www.journalpro.org/index.php/jad/article/view/44/4\u003c/li\u003e\n\u003c/ol\u003e"}],"fulltextSource":"","fullText":"","funders":[],"hasAdminPriorityOnWorkflow":false,"hasManuscriptDocX":false,"hasOptedInToPreprint":true,"hasPassedJournalQc":"","hasAnyPriority":true,"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":"Foreign Direct Investment, Granger Causality, Employment Growth, Employment Rate, Underemployment Rate, Labor Force Participation Rate, and Unemployment Rate","lastPublishedDoi":"10.21203/rs.3.rs-6291054/v1","lastPublishedDoiUrl":"https://doi.org/10.21203/rs.3.rs-6291054/v1","license":{"name":"CC BY 4.0","url":"https://creativecommons.org/licenses/by/4.0/"},"manuscriptAbstract":"\u003cp\u003eThis study examines the impact of foreign direct investment (FDI) on employment growth in the Philippines. The study investigates how FDI affects labor market indicators, including labor force participation, employment, unemployment, and underemployment rates in the long run. Using the yearly data from the World Bank and Philippines Statistics Authority from 1991 to 2022 and the Granger Causality Test, the findings suggest that the number of observations and lags of FDI to labor force participation rate and FDI to employment rate show a significant impact. Nevertheless, the Granger Causality suggests that FDI positively affects both labor force participation and employment rates in the long run and emphasizes the importance of attracting FDI for stimulating employment growth and overall economic development.\u003c/p\u003e","manuscriptTitle":"The Impact of Foreign Direct Investments on Labor Market Indicators of the Philippines using the Granger Causality","msid":"","msnumber":"","nonDraftVersions":[{"code":1,"date":"2025-03-25 04:23:45","doi":"10.21203/rs.3.rs-6291054/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":"ea898d23-e5d2-403b-b65a-b7e482a7752b","owner":[],"postedDate":"March 25th, 2025","published":true,"recentEditorialEvents":[],"rejectedJournal":[],"revision":"","amendment":"","status":"posted","subjectAreas":[],"tags":[],"updatedAt":"2025-04-15T13:38:45+00:00","versionOfRecord":[],"versionCreatedAt":"2025-03-25 04:23:45","video":"","vorDoi":"","vorDoiUrl":"","workflowStages":[]},"version":"v1","identity":"rs-6291054","journalConfig":"researchsquare"},"__N_SSP":true},"page":"/article/[identity]/[[...version]]","query":{"redirect":"/article/rs-6291054","identity":"rs-6291054","version":["v1"]},"buildId":"8U1c8b4HqxoKbykW_rLl7","isFallback":false,"isExperimentalCompile":false,"dynamicIds":[84888],"gssp":true,"scriptLoader":[]}

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