English

Comparing Fr\'echet and positive stable laws

Probability 2014-01-28 v2

Abstract

Let L{\bf L} be the unit exponential random variable and Zα{\bf Z}_\alpha the standard positive α\alpha-stable random variable. We prove that {(1α)αγαZαγα,0<α<1}\{(1-\alpha) \alpha^{\gamma_\alpha} {\bf Z}_\alpha^{-\gamma_\alpha}, 0< \alpha <1\} is decreasing for the optimal stochastic order and that {(1α)Zαγα,0<α<1}\{(1-\alpha){\bf Z}_\alpha^{-\gamma_\alpha}, 0< \alpha < 1\} is increasing for the convex order, with γα=α/(1α).\gamma_\alpha = \alpha/(1-\alpha). We also show that {Γ(1+α)Zαα,1/2α1}\{\Gamma(1+\alpha) {\bf Z}_\alpha^{-\alpha}, 1/2\le \alpha \le 1\} is decreasing for the convex order, that ZααstΓ(1α)\L{\bf Z}_\alpha^{-\alpha}\,\prec_{st}\, \Gamma(1-\alpha) \L and that Γ(1+\a)ZααcxL.\Gamma(1+\a){\bf Z}_\alpha^{-\alpha} \,\prec_{cx}\,{\bf L}. This allows to compare Zα{\bf Z}_\alpha with the two extremal Fr\'echet distributions corresponding to the behaviour of its density at zero and at infinity. We also discuss the applications of these bounds to the strange behaviour of the median of Zα{\bf Z}_\alpha and Zαα{\bf Z}_\alpha^{-\alpha} and to some uniform estimates on the classical Mittag-Leffler function. Along the way, we obtain a canonical factorization of Zα{\bf Z}_\alpha for α\alpha rational in terms of Beta random variables. The latter extends to the one-sided branches of real strictly stable densities.

Keywords

Cite

@article{arxiv.1310.1888,
  title  = {Comparing Fr\'echet and positive stable laws},
  author = {Thomas Simon},
  journal= {arXiv preprint arXiv:1310.1888},
  year   = {2014}
}

Comments

To appear in Electronic Journal of Probability

R2 v1 2026-06-22T01:41:57.385Z