The Poisson problem for the fractional Hardy operator: Distributional identities and singular solutions

Abstract

The purpose of this paper is to study and classify singular solutions of the Poisson problem %equationeq 0.1 \ aligned Lsμ u = f \ in\ \, \0\,\\ u =0 \ in\ \, RN \ %\\ %x 0\:|u(x)| /μ(x) = k. aligned . for the fractional Hardy operator Lμs u= (-)s u +μ|x|2su in a bounded domain ⊂ RN (N 2) containing the origin. Here (-)s, s∈(0,1), is the fractional Laplacian of order 2s, and μ μ0, where μ0 = -22s2(N+2s4)2(N-2s4)<0 is the best constant in the fractional Hardy inequality. The analysis requires a thorough study of fundamental solutions and associated distributional identities. Special attention will be given to the critical case μ= μ0 which requires more subtle estimates than the case μ>μ0.