Existence and Nonexistence Breaking Results For a Weighted Elliptic Problem in Half-Space

Abstract

In this paper we study the problem -div((xN)∇ u)=a|u|p-2u in RN+, -∂ u/∂ xN=b|u|q-2u in RN-1 where a,b ∈ R, p,q∈ (1,∞) and is a positive weight. We establish regularity results for weak solutions and, using a variational approach combined with a new Pohozaev-type identity, we show that the introduction of the weighted operator -div((xN)∇ u) can reverse the known solvability behavior of the classical Laplacian case. Specifically, we identify regimes where the problem admits solutions despite nonexistence for the corresponding case with -, and vice versa, thus inverting the classical existence and nonexistence results.

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