Gaussian-type Isoperimetric Inequalities in RCD(K,∞) probability spaces for positive K
Abstract
In this paper we adapt the well-estabilished -calculus techniques to the context of RCD(K,∞) spaces, proving Bobkov's local isoperimetric inequality and, when K is positive, the Gaussian isoperimetric inequality in this class of spaces. The proof relies on the measure-valued 2 operator introduced by Savar\'e.
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