English

Structured linear factor models for tail dependence

Statistics Theory 2026-01-21 v2 Methodology Statistics Theory

Abstract

A common object to describe the extremal dependence of a dd-variate random vector XX is the stable tail dependence function LL. Various parametric models have emerged, with a popular subclass consisting of those stable tail dependence functions that arise for linear and max-linear factor models with heavy tailed factors. The stable tail dependence function is then parameterized by a d×Kd \times K matrix AA, where KK is the number of factors and where AA can be interpreted as a factor loading matrix. We study estimation of LL under an additional assumption on AA called the `pure variable assumption'. Both K{1,,d}K \in \{1, \dots, d\} and A[0,)d×KA \in [0, \infty)^{d \times K} are treated as unknown, which constitutes an unconventional parameter space that does not fit into common estimation frameworks. We suggest two algorithms that allow to estimate KK and AA, and provide finite sample guarantees for both algorithms. Remarkably, the guarantees allow for the case where the dimension dd is larger than the sample size nn. The results are illustrated with numerical experiments and two case studies.

Keywords

Cite

@article{arxiv.2507.16340,
  title  = {Structured linear factor models for tail dependence},
  author = {Alexis Boulin and Axel Bücher},
  journal= {arXiv preprint arXiv:2507.16340},
  year   = {2026}
}

Comments

42 pages

R2 v1 2026-07-01T04:12:55.946Z