Distribution and asymptotics under beta random scaling
Abstract
Let X,Y,B be three independent random variables such that has the same distribution function as Y B. Assume that B is a Beta random variable with positive parameters a,b and Y has distribution function H. Pakes and Navarro (2007) show under some mild conditions that the distribution function H_{a,b} of X determines H. Based on that result we derive in this paper a recursive formula for calculation of H, if H_{a,b} is known. Furthermore, we investigate the relation between the tail asymptotic behaviour of X and Y. We present three applications of our asymptotic results concerning the extremes of two random samples with underlying distribution functions H and H_{a,b}, respectively, and the conditional limiting distribution of bivariate elliptical distributions.
Cite
@article{arxiv.0812.0881,
title = {Distribution and asymptotics under beta random scaling},
author = {Enkelejd Hashorva and Anthony Pakes},
journal= {arXiv preprint arXiv:0812.0881},
year = {2013}
}
Comments
12 pages