Nonlocal Hardy type inequalities with optimal constants and remainder terms

Abstract

Using a groundstate transformation, we give a new proof of the optimal Stein-Weiss inequality of Herbst [∫N ∫N (x)xα2 Iα (x - y) (y)yα2 x y CN,α, 0∫N 2,] and of its combinations with the Hardy inequality by Beckner [∫N ∫N (x)xα + s2 Iα (x - y) (y)yα + s2 x y CN, α, 1 ∫N ∇ 2,] and with the fractional Hardy inequality [∫N ∫N (x)xα + s2 Iα (x - y) (y)yα + s2 x y CN, α, s DN, s ∫N ∫N (x) - (y)2x-yN+s x y] where (Iα) is the Riesz potential, (0 < α < N) and (0 < s < (N, 2)). We also prove the optimality of the constants. The method is flexible and yields a sharp expression for the remainder terms in these inequalities.