Blowing-up solutions for the Choquard type Brezis-Nirenberg problem in dimension three
Abstract
In this paper, we are interested in the existence of solutions for the following Choquard type Brezis-Nirenberg problem align* \ arrayll - u=(∫u6-α(y)|x-y|αdy)u5-α+λ u, \ \ &in\ , u=0, \ \ &on\ ∂ , array . align* where is a smooth bounded domain in R3, α∈ (0,3), 6-α is the upper critical exponent in the sense of the Hardy-Littlewood-Sobolev inequality, and λ is a real positive parameter. By applying the reduction argument, we find and characterize a positive value λ0 such that if λ-λ0>0 is small enough, then the above problem admits a solution, which blows up and concentrates at the critical point of the Robin function as λ→ λ0. Moreover, we consider the above problem under zero Neumann boundary condition.
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