Existence and multiplicity of positive solutions to a critical elliptic equation with logarithmic perturbation
Abstract
We consider the existence and multiplicity of positive solutions for the following critical problem with logarithmic term: equation*eq11\ arrayll - u=μ|u|2 -2u+ |u|q-2u+λ u+θ u u2, &x∈ ,\\ u=0, &x∈ ∂ ,\\ array .equation* where ⊂ RN is a bounded smooth domain, , λ∈ R, μ>0, θ<0, N3, 2 =2NN-2 is the critical Sobolev exponent for the embedding H10() L2() and q∈ (2, 2*), and which can be seen as a Brezis-Nirenberg problem. Under some assumptions on the μ, , λ, θ and q, we will prove that the above problem has at least two positive solutions: One is the least energy solution, and the other one is the Mountain pass solution. As far as we know, the existing results on the existence of positive solutions to a Brezis-Nirenberg problem are to find a positive solution, and no one has given the existence of at least two positive solutions on it. So our results is totally new on this aspect.
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