An Opposite Gaussian Product Inequality
Abstract
The long-standing Gaussian product inequality (GPI) conjecture states that E [Πj=1n|Xj|αj]≥Πj=1nE[|Xj|αj] for any centered Gaussian random vector (X1,…,Xn) and any non-negative real numbers αj, j=1,…,n. In this note, we prove a novel "opposite GPI" for centered bivariate Gaussian random variables when -1<α1<0 and α2>0: E[|X1|α1|X2|α2] E[|X1|α1]E[|X2|α2]. This completes the picture of bivariate Gaussian product relations.
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