Bounding Conditional Value-at-Risk via Auxiliary Distributions with Bounded Discrepancies

Abstract

In this paper, we develop a theoretical framework for bounding the CVaR of a random variable X using another related random variable Y, under assumptions on their cumulative and density functions. Our results yield practical tools for approximating CVaRα(X) when direct information about X is limited or sampling is computationally expensive, by exploiting a more tractable or observable random variable Y. Moreover, the derived bounds provide interpretable concentration inequalities that quantify how the tail risk of X can be controlled via Y.