Singular elliptic problems with lack of compactness

Abstract

We consider the following nonlinear singular elliptic equation -div (|x|-2a∇ u)=K(x)|x|-bp|u|p-2u+ g(x) in N, where g belongs to an appropriate weighted Sobolev space, and p denotes the Caffarelli-Kohn-Nirenberg critical exponent associated to a, b, and N. Under some natural assumptions on the positive potential K(x) we establish the existence of some \0>0 such that the above problem has at least two distinct solutions provided that ∈(0,\0). The proof relies on Ekeland's Variational Principle and on the Mountain Pass Theorem without the Palais-Smale condition, combined with a weighted variant of the Brezis-Lieb Lemma.

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