Existence of a critical point for the infinite divisibility of squares of Gaussian vectors in R2 with non--zero mean

Abstract

Let G=(G1,G2) be a Gaussian vector in R2 with EG1G2≠ 0. Let c1,c2∈ R1. A necessary and sufficient condition for G=((G1+c1α)2,(G2+c2α)2) to be infinitely divisible for all α∈ R1 is that \[ i,i≥ cicji,j>0∀ 1 i j 2.\] In this paper we show that when this does not hold there exists an 0<α0< such that G=((G1+c1α)2,(G2+c2α)2) is infinitely divisible for all |α|≤ α0 but not for any ||>0.