Characterizations of compactness and weighted eigenvalue problem associated with fractional Hardy-type inequalities

Abstract

In this article, we consider the following fractional Hardy-type inequality: align Fractional Hardyabst ∫RN |w(x)||u(x)|p dx ≤ C ∫RN × RN |u(x)-u(y)|p|x-y|N+sp dxdy:= \|u\|s,pp\,, \ ∀ u ∈ Ds,p(RN), align where 0<s<1<p<Ns, and Ds,p(RN) is the completion of Cc1(RN) with respect to the norm \|·\|s,p. We denote the space of admissible weight function w in Fractional Hardyabst by Hs,p(RN). Maz'ya-type characterization helps us to define a Banach function norm on Hs,p(RN). Using the Banach function space structure and the concentration compactness type arguments, we provide several characterizations for the compactness of the map W(u)= ∫RN |w| |u|p dx on Ds,p(RN). In particular, we prove that W is compact on Ds,p(RN) if and only if w ∈ Hs,p,0(RN):=Cc(RN) \ in \ Hs,p(RN). Further, we study the following weighted eigenvalue problem: equation* (-Δp)su = λw(x) |u|p-2u ~~in~RN, equation* where (-Δp)s is the fractional p-Laplace operator and w = w1 - w2~with~ w1,w2 ≥ 0, is such that w1 ∈ Hs,p,0(RN) and w2 ∈ L1loc(RN).