Cascade of minimizers for a nonlocal isoperimetric problem in thin domains

Abstract

For =(0,)× (0,1) a thin rectangle, we consider minimization of the two-dimensional nonlocal isoperimetric problem given by \[ ∈fu Eγ_(u)\] where \[ Eγ_(u):= P_(\u(x)=1\)+γ∫_∇v2\,dx \] and the minimization is taken over competitors u∈ BV(;\ 1\) satisfying a mass constraint _u=m for some m∈ (-1,1). Here P_(\u(x)=1\) denotes the perimeter of the set \u(x)=1\ in , denotes the integral average and v denotes the solution to the Poisson problem \[ - v=u-m\;in\;,∇ v· n∂=0\;on\;∂,∫_v=0.\] We show that a striped pattern is the minimizer for 1 with the number of stripes growing like γ1/3 as γ∞. We then present generalizations of this result to higher dimensions.