Minimizers of nonlocal interaction functional with exogenous potential

Abstract

The purpose of this paper is to consider the minimization problem of the following nonlocal interaction functional equation* E[]=12∫RN ∫RNK(x-y)(x)(y)dxdy+∫RNF(x)(x)dx. equation* The kernel K(x)=1q|x|q-1p|x|p is an endogenous potential, where q>p>-N. The exogenous potential F is a nonnegative continuous function and satisfies F(x) +∞ as |x| +∞. The existence of minimizers are established based on the concentration compactness principle. Especially, for F(x)=β|x|2(β >0) and K(x)=12|x|2-12-N|x|2-N(N>2), the global minimizer is given explicitly by the method of calculus of variation.