Optimal Hardy-weights for the Finsler p-Dirichlet integral with a potential
Abstract
Fix an integer n≥ 2, an exponent 1<p<∞, and a domain ⊂eqRn. Let *\x\ where x∈. Under some further conditions, we construct optimal Hardy-weights for the Finsler p-Dirichlet integral Q0[φ;*]∫*H(x,∇ φ)p\,dx on C∞c(*), and the Finsler p-Dirichlet integral with a potential QV[φ;]∫(H(x,∇ φ)p+ V|φ|p)\,dx on C∞c(),where H(x,·) is a family of norms on Rn parameterized by x∈* or x∈, respectively, and the potential V lies in a subspace Mq loc(p;) of a local Morrey space Mq loc(p;).
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