A Note on the Gaussian Minimum Conjecture

Abstract

Let n≥ 2 and (Xi,1≤ i≤ n) be a centered Gaussian random vector. The Gaussian minimum conjecture says that E(1≤ i≤ n|Xi|)≥ E(1≤ i≤ n|Yi|), where Y1,…,Yn are independent centered Gaussian random variables with E(Xi2)=E(Yi2) for any i=1,…,n. In this note, we will show that this conjecture holds if and only if n=2.