Risk measures based on weak optimal transport
Abstract
In this paper, we study convex risk measures with weak optimal transport penalties. In a first step, we show that these risk measures allow for an explicit representation via a nonlinear transform of the loss function. In a second step, we discuss computational aspects related to the nonlinear transform as well as approximations of the risk measures using, for example, neural networks. Our setup comprises a variety of examples, such as classical optimal transport penalties, parametric families of models, uncertainty on path spaces, moment constrains, and martingale constraints. In a last step, we show how to use the theoretical results for the numerical computation of worst-case losses in an insurance context and no-arbitrage prices of European contingent claims after quoted maturities in a model-free setting.
Cite
@article{arxiv.2312.05973,
title = {Risk measures based on weak optimal transport},
author = {Michael Kupper and Max Nendel and Alessandro Sgarabottolo},
journal= {arXiv preprint arXiv:2312.05973},
year = {2023}
}