Optimal decay and regularity for a Thomas--Fermi type variational problem

Abstract

We study existence and qualitative properties of the minimizers for a Thomas--Fermi type energy functional defined by Eα():=1q∫Rd|(x)|q dx+12Rd×Rd(x)(y)|x-y|d-αdx dy-∫RdV(x)(x)dx, where d 2, α∈ (0,d) and V is a potential. Under broad assumptions on V we establish existence, uniqueness and qualitative properties such as positivity, regularity and decay at infinity of the global minimizer. The decay at infinity depends in a non--trivial way on the choice of α and q. If α∈ (0,2) and q>2 the global minimizer is proved to be positive under mild regularity assumptions on V, unlike in the local case α=2 where the global minimizer has typically compact support. We also show that if V decays sufficiently fast the global minimizer is sign--changing even if V is non--negative. In such regimes we establish a relation between the positive part of the global minimizer and the support of the minimizer of the energy, constrained on the non--negative functions. Our study is motivated by recent models of charge screening in graphene, where sign--changing minimizers appear in a natural way.