Finsler p-Laplace equation with a potential: Maz'ya-type characterization and attainments of the Hardy constant

Abstract

We study positive properties of the quasilinear elliptic equation -divA(x,∇ u)+V|u|p-2u=0 (1<p<∞) in , where the function A(x,) is induced by a family of norms on Rn (n≥ 2) parameterized by points in the domain ⊂eqRn, and V belongs to a certain local Morrey space. We first establish two-sided estimates for Bregman distances of ||ps,a (1<s<∞), where a=(a1,a2,…,an) and a1,a2,…,an are certain functions with positive local lower and upper bounds in . These estimates lead to a Maz'ya-type characterization for Hardy-weights of the corresponding functionals. Then we prove three types of sufficient conditions for the attainment of the Hardy constant in a certain space W1,p0().

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