Compact embedding from variable-order Sobolev space to Lq(x)() and its application to Choquard equation with variable order and variable critical exponent

Abstract

In this paper, we prove the compact embedding from the variable-order Sobolev space Ws(x,y),p(x,y)0 () to the Nakano space Lq(x)() with a critical exponent q(x) satisfying some conditions. It is noteworthy that the embedding can be compact even when q(x) reaches the critical Sobolev exponent ps*(x). As an application, we obtain a nontrivial solution of the Choquard equation equation* (-)p(·,·)s(·,·)u+|u|p(x,x)-2u=(∫|u(y)|r(y)|x-y|α(x)+α(y)2dy) |u(x)|r(x)-2u(x) equation* with variable upper critical exponent in the sense of Hardy-Littlewood-Sobolev inequality under an appropriate boundary condition.