Borderline variational problems involving fractional Laplacians and critical singularities

Abstract

We consider the problem of attainability of the best constant in the following critical fractional Hardy-Sobolev inequality: equation* μγ,s(n):= ∈fu ∈ Hα2 (n) \0\ ∫n |(- )α4u|2 dx - γ ∫n |u|2|x|αdx (∫n |u|2α*(s)|x|sdx)22α*(s), equation* where 0≤ s<α<2, n>α, 2α*(s):=2(n-s)n-α, and γ ∈ R. This allows us to establish the existence of nontrivial weak solutions for the following doubly critical problem on n, equation* \arraylll (- )α2u- γ u|x|α&= |u|2α*-2 u + |u|2α*(s)-2u|x|s & in n\\ u&>0 & in n, array. equation* where 2α*:=2 nn-α is the critical α-fractional Sobolev exponent, and γ < γH:=2α 2(n+α4)2(n-α4), the latter being the best fractional Hardy constant on n.