The existence of minimizers for an isoperimetric problem with Wasserstein penalty term in unbounded domains

Abstract

In this article, we consider the (double) minimization problem \P(E;)+λ Wp(E,F):~E⊂eq,~F⊂eq Rd,~ E F=0,~ E= F=1\, where p≥slant 1, is a (possibly unbounded) domain in Rd, P(E;) denotes the relative perimeter of E in and Wp denotes the p-Wasserstein distance. When is unbounded and d≥slant 3, it is an open problem proposed by Buttazzo, Carlier and Laborde in the paper ON THE WASSERSTEIN DISTANCE BETWEEN MUTUALLY SINGULAR MEASURES. We prove the existence of minimizers to this problem when 1p+2d>1, =Rd and λ is sufficiently small.