Brezis-Nirenberg-type results for the anisotropic p-Laplacian
Abstract
In this paper we consider a quasilinear elliptic and critical problem with Dirichlet boundary conditions in presence of the anisotropic p-Laplacian. The critical exponent is the usual p such that the embedding W1,p0() ⊂ Lp() is not compact. We prove the existence of a weak positive solution in presence of both a p-linear and a p-superlinear perturbation. In doing this, we have to perform several precise estimates of the anisotropic Aubin-Talenti functions which can be of interest for further problems. The results we prove are a natural generalization to the anisotropic setting of the classical ones by Brezis-Nirenberg BN.
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