Isoperimetry for spherically symmetric log-concave probability measures

Abstract

We prove an isoperimetric inequality for probability measures μ on Rn with density proportional to (-φ(λ | x|)), where |x| is the euclidean norm on Rn and φ is a non-decreasing convex function. It applies in particular when φ(x)=xα with α1. Under mild assumptions on φ, the inequality is dimension-free if λ is chosen such that the covariance of μ is the identity.