Divergence Based Quadrangle and Applications
Abstract
This paper introduces a novel framework for assessing risk and decision-making in the presence of uncertainty, the \emph{-Divergence Quadrangle}. This approach expands upon the traditional Risk Quadrangle, a model that quantifies uncertainty through four key components: \emph{risk, deviation, regret}, and \emph{error}. The -Divergence Quadrangle incorporates the -divergence as a measure of the difference between probability distributions, thereby providing a more nuanced understanding of risk. Importantly, the -Divergence Quadrangle is closely connected with the distributionally robust optimization based on the -divergence approach through the duality theory of convex functionals. To illustrate its practicality and versatility, several examples of the -Divergence Quadrangle are provided, including the Quantile Quadrangle. The final portion of the paper outlines a case study implementing regression with the Entropic Value-at-Risk Quadrangle. The proposed -Divergence Quadrangle presents a refined methodology for understanding and managing risk, contributing to the ongoing development of risk assessment and management strategies.
Cite
@article{arxiv.2306.16525,
title = {Divergence Based Quadrangle and Applications},
author = {Anton Malandii and Siddhartha Gupte and Cheng Peng and Stan Uryasev},
journal= {arXiv preprint arXiv:2306.16525},
year = {2023}
}
Comments
Incomplete result