Using Sums-of-Squares to Prove Gaussian Product Inequalities

Abstract

The long-standing Gaussian product inequality (GPI) conjecture states that E [Πj=1nXj2mj]≥Πj=1nE[Xj2mj] for any centered Gaussian random vector (X1,…,Xn) and m1,…,mn∈N. In this paper, we describe a computational algorithm involving sums-of-squares representations of multivariate polynomials that can be used to resolve the GPI conjecture. To exhibit the power of this novel method, we apply it to prove two new GPIs: E[X12m1X26X34] E[X12m1]E[X26]E[X34] and E[X12m1X22X32X42] E[X12m1]E[X22]E[X32]E[X42].

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