Produit Beta-Gamma et r\'egularit\'e du signe

Abstract

We study the total positivity of the multiplicative convolution kernel T associated with the independent product of two random variables B(a,b) and (c). This kernel is totally positive of infinite order if b or d = a+b -c are integers. Otherwise the sign-regularity of T has always a finite order, which is here computed. More precisely, for every n 1 it is shown that T is totally positive of order n + 1 if and only if (d,b) lies above a certain stairway En plotted in the upper half-plane. This stairway also characterizes the sign-invariance of several determinants associated with the confluent hypergeometric function of the second kind.