English

Risk Quantization by Magnitude and Propensity

Applications 2021-05-28 v1

Abstract

We propose a novel approach in the assessment of a random risk variable XX by introducing magnitude-propensity risk measures (mX,pX)(m_X,p_X). This bivariate measure intends to account for the dual aspect of risk, where the magnitudes xx of XX tell how hign are the losses incurred, whereas the probabilities P(X=x)P(X=x) reveal how often one has to expect to suffer such losses. The basic idea is to simultaneously quantify both the severity mXm_X and the propensity pXp_X of the real-valued risk XX. This is to be contrasted with traditional univariate risk measures, like VaR or Expected shortfall, which typically conflate both effects. In its simplest form, (mX,pX)(m_X,p_X) is obtained by mass transportation in Wasserstein metric of the law PXP^X of XX to a two-points {0,mX}\{0, m_X\} discrete distribution with mass pXp_X at mXm_X. The approach can also be formulated as a constrained optimal quantization problem. This allows for an informative comparison of risks on both the magnitude and propensity scales. Several examples illustrate the proposed approach.

Cite

@article{arxiv.2105.13002,
  title  = {Risk Quantization by Magnitude and Propensity},
  author = {Olivier P. Faugeras and Gilles Pagès},
  journal= {arXiv preprint arXiv:2105.13002},
  year   = {2021}
}
R2 v1 2026-06-24T02:31:07.219Z