A critical neumann problem with anisotropic p-laplacian

Abstract

We are concerned with the existence of solution of the problem - Hpu+|u|p-2u=λ|u|q-2u+ |u|p*-2u in, u>0 in, a(∇ u)· =0 on∂ , where Hpu=div\,(a(∇ u)), with a()=Hp-1()∇ H(),\, ∈ RN, N≥slant3, is the anisotropic p-Laplacian with 1<p<N, λ>0 is a parameter, and p < q<p*=pN/(N-p). Further, ⊂ is a C1 bounded domain inside a convex open cone in RN with ∂ ∂ being a C1-manifold, and is the unit outward normal to ∂ . To succeed with a variational approach, where the strong convergence of a bounded (PS) subsequence needs to be proved, one has to deal with anisotropic norms in the absence of a Tartar's type inequality, unlike the isotropic p-Laplace case. This is overcome by proving the a.e. convergence of its gradients. Furthermore, the solution of (P) is shown to belong to C1,α(), and is strictly positive in . Such conclusions are achieved from classical elliptic regularity theory and a Harnack inequality, since the solution of (P) is bounded. This in turn is a consequence of a result in this paper which ensures that any W1,p-solution of critical Neumann problems with the anisotropic p-Laplacian operator on bounded Lipschitz domains in RN (N≥slant3) is bounded.

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