The space of Hardy-weights for quasilinear equations: Maz'ya-type characterization and sufficient conditions for existence of minimizers

Abstract

Let p ∈ (1,∞) and ⊂ RN be a domain. Let A: =(aij) ∈ L∞loc(; RN× N) be a symmetric and locally uniformly positive definite matrix. Set ||A2:= Σi,j=1N aij(x) i j, ∈ RN, and let V be a given potential in a certain local Morrey space. We assume that the energy functional Qp,A,V(φ):= ∫ [|∇ φ|Ap + V|φ|p] dx is nonnegative in W1,p() Cc(). We introduce a generalized notion of Qp,A,V-capacity and characterize the space of all Hardy-weights for the functional Qp,A,V, extending Maz'ya's well known characterization of the space of Hardy-weights for the p-Laplacian. In addition, we provide various sufficient conditions on the potential V and the Hardy-weight g such that the best constant of the corresponding variational problem is attained in an appropriate Beppo-Levi space.