中文

Hidden Dependence and Aggregate Tail Risk

风险管理 2026-06-29 v1 数理金融

摘要

We study risk aggregation problems for arbitrary non-decreasing aggregation functions and tail risk measures under dependence uncertainty in a distributionally robust setting. To this end, we introduce the notion of hidden dependence for random vectors, which is built on the concepts of risk concentration and common tail events developed in Wang and Zitikis (2020). We show that, starting from a tail event AA of the aggregate loss for an arbitrary random vector YY, one can construct a random vector with hidden dependence that dominates YY on the tail event AA. We then focus on the case in which model uncertainty is described by small perturbations of the distribution of a random vector with respect to a suitable probability distance without changing the marginals. We show that these perturbations of the reference distribution are compatible with hidden dependence and thus lead to the same worst-case risk bounds as in the unconstrained case for arbitrary γ\gamma-tail risk measures with a suitable level γ\gamma. Finally, we apply our results in a credit risk context and quantify the potential underestimation of portfolio risk arising from uncertainty in the dependence structure. In particular, we show that even small deviations from a reference Gaussian dependence model can, in principle, justify dramatic increases in capital requirements.

引用

@article{arxiv.2606.30193,
  title  = {Hidden Dependence and Aggregate Tail Risk},
  author = {Corrado De Vecchi and Max Nendel and Steven Vanduffel},
  journal= {arXiv preprint arXiv:2606.30193},
  year   = {2026}
}