Robust portfolio optimization with copulas. Kakouris, I. & Rustem, B. European Journal of Operational Research, 235(1):28–37, May, 2014. 72 citations (Semantic Scholar/DOI) [2023-06-08]
Paper doi abstract bibtex Conditional Value at Risk (CVaR) is widely used in portfolio optimization as a measure of risk. CVaR is clearly dependent on the underlying probability distribution of the portfolio. We show how copulas can be introduced to any problem that involves distributions and how they can provide solutions for the modeling of the portfolio. We use this to provide the copula formulation of the CVaR of a portfolio. Given the critical dependence of CVaR on the underlying distribution, we use a robust framework to extend our approach to Worst Case CVaR (WCVaR). WCVaR is achieved through the use of rival copulas. These rival copulas have the advantage of exploiting a variety of dependence structures, symmetric and not. We compare our model against two other models, Gaussian CVaR and Worst Case Markowitz. Our empirical analysis shows that WCVaR can asses the risk more adequately than the two competitive models during periods of crisis.
@article{kakouris_robust_2014,
title = {Robust portfolio optimization with copulas},
volume = {235},
issn = {03772217},
url = {https://linkinghub.elsevier.com/retrieve/pii/S0377221713010060},
doi = {10.1016/j.ejor.2013.12.022},
abstract = {Conditional Value at Risk (CVaR) is widely used in portfolio optimization as a measure of risk. CVaR is clearly dependent on the underlying probability distribution of the portfolio. We show how copulas can be introduced to any problem that involves distributions and how they can provide solutions for the modeling of the portfolio. We use this to provide the copula formulation of the CVaR of a portfolio. Given the critical dependence of CVaR on the underlying distribution, we use a robust framework to extend our approach to Worst Case CVaR (WCVaR). WCVaR is achieved through the use of rival copulas. These rival copulas have the advantage of exploiting a variety of dependence structures, symmetric and not. We compare our model against two other models, Gaussian CVaR and Worst Case Markowitz. Our empirical analysis shows that WCVaR can asses the risk more adequately than the two competitive models during periods of crisis.},
language = {en},
number = {1},
urldate = {2023-06-07},
journal = {European Journal of Operational Research},
author = {Kakouris, Iakovos and Rustem, Berç},
month = may,
year = {2014},
note = {72 citations (Semantic Scholar/DOI) [2023-06-08]},
keywords = {/unread},
pages = {28--37},
}
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