Portfolio investment reflects a commitment to the allocation of funds or resources which is considered a strategic step in managing assets to achieve future profits. This research begins with a careful analysis of a portfolio consisting of the ten best stocks on the Indonesia Stock Exchange (IDX). Through in-depth processing and analysis of stock data, the dynamics of performance, risk and volatility involved in each investment commitment are revealed. The Value-at-Risk (VaR) and Conditional Value-at-Risk (CVaR) methods at the 90%, 95%, and 99% confidence levels take centre stage, highlighting the potential for increased losses as confidence levels increase. In-depth analysis illustrates that CVaR, considering the extreme risks in the distribution, provides a more holistic picture than VaR. With a VaR (99%) value of IDR 84,973,959,424 and CVaR (99%) of IDR 471,795,822,064, this research provides a concrete picture of potential risks at the highest level of confidence. These results confirm that CVaR has a crucial role in identifying and measuring the potential for more significant losses, especially in the face of unexpected market uncertainty. As a guide for investment decision makers, this research forms an important basis for carefully considering the level of risk and potential return at various levels of confidence. This allows the development of smarter and more informed investment strategies.

Kolm, P.N., Tütüncü, R., & Fabozzi, F.J. (2014). 60 Years of portfolio optimization: Practical challenges and current trends. European Journal of Operational Research, 234(2), 356-371.

Shapiro, A., D. Dentcheva, & A. Ruszczynski (2014). Lectures on Stochastic Programming. 2nd edition. MOS-SIAM Series on Optimization. Society for Industrial and Applied Mathematics.

Markowitz, H. (1952). Portfolio Selection. The Journal of Finance, 7(1), 77-91.

Rockafellar, R.T., & Uryasev, S. (2002). Conditional value-at-risk for general loss distributions. Journal of Banking and Finance, 26(7), 1443–1471.

Rockafellar, R.T. (2007). Coherent approaches to risk optimization under uncertainty. In: Klastorin, T.,Tutorials in Operations Research: OR Tools and Applications−Glimpses of Future Technologies, INFORMS,Catonsville, MD, pp. 38-61

Mansini, R., Ogryczak, W., & Speranza, M.G. (2014). Twenty years of linear programming-based portfolio optimization. European Journal of Operational Research, 234(2), 518-535.

Ahmadi-Javid, A. (2011, July). An information-theoretic approach to constructing coherent risk measures. In:Proceedings of IEEE International Symposium on Information Theory, St. Petersburg, 2011, pp. 2125-2127.

Ahmadi-Javid, A. (2012a). Entropic value-at-risk: A new coherent risk measure. Journal of OptimizationTheory and Appications, 155 (3), 1105-1123

Pichler, A. (2017). A quantitative comparison of risk measures. Annals of Operations Research, online, DOI:10.1007/s10479-017-2397-3.

Delbaen, F. (2018). Remark on the Paper" Entropic value-at-risk: A new coherent risk measure". In Barrieu P.(ed.) Risk and Stochastics, 2018, World Scintific, to appaer. Avaiable at arXiv preprint, arXiv:1504.00640.

Sharpe, W. F. (1963). A simplified model for portfolio analysis. Management Science, 9(2), 277-293.

Liu, C., & Zhu, W. (2024). Newsvendor conditional value-at-risk minimisation: A feature-based approach under adaptive data selection. European Journal of Operational Research, 313(2), 548–564. https://doi.org/10.1016/j.ejor.2023.08.043

Wang, X., Zhu, Y., & Tang, P. (2024). Uncertain mean-CVaR model for portfolio selection with transaction cost and investors’ preferences. North American Journal of Economics and Finance, 69. https://doi.org/10.1016/j.najef.2023.102028

Beutner, E., Heinemann, A., & Smeekes, S. (2024). A residual bootstrap for conditional Value-at-Risk. Journal of Econometrics, 238(2). https://doi.org/10.1016/j.jeconom.2023.105554

Zou, Z., Wu, Q., Xia, Z., & Hu, T. (2023). Adjusted Rényi entropic Value-at-Risk. European Journal of Operational Research, 306(1), 255–268. https://doi.org/10.1016/j.ejor.2022.08.028

Liu, X., Yan, X., & Zhang, K. (2024). Kernel quantile estimators for nested simulation with application to portfolio value-at-risk measurement. European Journal of Operational Research, 312(3), 1168–1177. https://doi.org/10.1016/j.ejor.2023.07.040

Chennaf, S., & Amor, J. ben. (2023). Entropic value at risk to find the optimal uncertain random portfolio. Soft Computing, 27(20), 15185–15197. https://doi.org/10.1007/s00500-023-08547-5

Ahmadi-Javid, A., & Pichler, A. (2017). An analytical study of norms and Banach spaces induced by the entropic value-at-risk. Mathematics and Financial Economics, 11(4), 527–550. https://doi.org/10.1007/s11579-017-0197-9

Ahmadi-Javid, A., & Fallah-Tafti, M. (n.d.). Portfolio Optimization with Entropic Value-at-Risk.

Ahmadi-Javid, A. (2012). Addendum to: Entropic Value-at-Risk: A New Coherent Risk Measure. Journal of Optimization Theory and Applications, 155(3), 1124–1128. https://doi.org/10.1007/s10957-012-0014-9

Tandelilin, E., (2010), Analisis Investasi dan Manjemen Portofolio, Edisi Pertama, Kanisius.