Local Uniqueness of blow-up solutions for critical Hartree equations in bounded domain

Abstract

In this paper we are interested in the following critical Hartree equation equation* cases - u =(∫u2μ ()|x-|μd)u2μ-1+ u ,~~~in~,\\ u=0,~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~on~∂, cases equation* where N≥4, 0<μ≤4, >0 is a small parameter, is a bounded domain in RN, and 2μ=2N-μN-2 is the critical exponent in the sense of the Hardy-Littlewood-Sobolev inequality. By establishing various versions of local Pohozaev identities and applying blow-up analysis, we first investigate the location of the blow-up points for single bubbling solutions to above the Hartree equation. Next we prove the local uniqueness of the blow-up solutions that concentrates at the non-degenerate critical point of the Robin function for small.