Bubble solution for the critical Hartree equation in pierced domain

Abstract

In this article, we establish the existence of solutions to the following critical Hartree equation align* cases - u=(∫_u2μ*|x-y|μdy)u2μ*-1, & in , \\ u=0, & on ∂, cases align* where 2μ*=2N-μN-2 is the upper critical exponent in the sense of the Hardy-Littlewood-Sobolev inequality, N≥ 5, 0<μ<4 with μ sufficiently close to 0, := B(0,) and is a bounded smooth domain in RN, which contains the origin, and is a positive parameter. As goes to zero, we construct bubble solution which blows up at the origin.

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