The 4-D Gaussian Random Vector Maximum Conjecture and the 3-D Simplex Mean Width Conjecture

Abstract

We prove the four-dimensional Gaussian random vector maximum conjecture. This conjecture asserts that among all centered Gaussian random vectors X=(X1,X2,X3,X4) with E[Xi2]=1, 1 i 4, the expectation E[(X1,X2,X3,X4)] is maximal if and only if all off-diagonal elements of the covariance matrix equal -13. As a direct consequence, we resolve the three-dimensional simplex mean width conjecture. This latter conjecture is a long-standing open problem in convex geometry, which asserts that among all simplices inscribed into the three-dimensional unit Euclidean ball the regular simplex has the maximal mean width.