Remarks on Brunn-Minkowski-type inequalities related to the Ornstein-Uhlenbeck operator

Abstract

We investigate Brunn-Minkowski-type inequalities for the torsional rigidity Tγ and the first eigenvalue λγ associated with the Ornstein-Uhlenbeck operator. Counterexamples are provided showing that neither concavity nor convexity properties hold for Tγ on general bounded convex sets. We also demonstrate that log-concavity and log-convexity properties fail in this setting. In the case of centrally symmetric sets, we answer a question raised by Cordero-Erausquin and Eskenazis by showing that Tγ1/(n+2) is neither convex nor concave. On the positive side, we prove that Tγ1/3 is convex with respect to Minkowski addition when restricted to Euclidean balls centered at the origin. For λγ, we answer negatively a question posed by Colesanti, Francini, Livshyts, and Salani by showing that the inequality λγ(t)-1/2 ≥ (1-t)λγ(0)-1/2 + tλγ(1)-1/2 does not hold, even for centrally symmetric sets.

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