Robust Wasserstein Optimization and its Application in Mean-CVaR
Mathematical Finance
2023-06-28 v1
Abstract
We refer to recent inference methodology and formulate a framework for solving the distributionally robust optimization problem, where the true probability measure is inside a Wasserstein ball around the empirical measure and the radius of the Wasserstein ball is determined by the empirical data. We transform the robust optimization into a non-robust optimization with a penalty term and provide the selection of the Wasserstein ambiguity set's size. Moreover, we apply this framework to the robust mean-CVaR optimization problem and the numerical experiments of the US stock market show impressive results compared to other popular strategies.
Cite
@article{arxiv.2306.15524,
title = {Robust Wasserstein Optimization and its Application in Mean-CVaR},
author = {Xin Hai and Kihun Nam},
journal= {arXiv preprint arXiv:2306.15524},
year = {2023}
}