An isoperimetric inequality in the plane with a log-convex density

Abstract

Given a positive lower semi-continuous density f on R2 the weighted volume Vf:=fL2 is defined on the L2-measurable sets in R2. The f-weighted perimeter of a set of finite perimeter E in R2 is written Pf(E). We study minimisers for the weighted isoperimetric problem \[ If(v):=∈f\ Pf(E):E is a set of finite perimeter in R2 and Vf(E)=v\ \] for v>0. Suppose f takes the form f:R2→(0,+∞);x eh(|x|) where h:[0,+∞)→R is a non-decreasing convex function. Let v>0 and B a centred ball in R2 with Vf(B)=v. We show that B is a minimiser for the above variational problem and obtain a uniqueness result.