Sharp reversed Hardy-Littlewood-Sobolev inequality with extended kernel

Abstract

In this paper, we prove the following reversed Hardy-Littlewood-Sobolev inequality with extended kernel equation* ∫R+n∫∂Rn+ xnβ|x-y|n-αf(y)g(x) dydx≥ Cn,α,β,p\|f\|Lp(∂R+n) \|g\|Lq'(R+n) equation* for any nonnegative functions f∈ Lp(∂R+n) and g∈ Lq'(R+n), where n≥2, p,\ q'∈ (0,1), α>n, 0≤β<α-nn-1, p>n-1α-1-(n-1)β such that n-1n1p+1q'-α+β-1n=1. We prove the existence of extremal functions for the above inequality. Moreover, in the conformal invariant case, we classify all the extremal functions and hence derive the best constant via a variant method of moving spheres, which can be carried out without lifting the regularity of Lebesgue measurable solutions. Finally, we derive the sufficient and necessary conditions for existence of positive solutions to the Euler-Lagrange equations by using Pohozaev identities. Our results are inspired by Hang, Wang and Yan HWY, Dou, Guo and Zhu DGZ for α<n and β=1, and Gluck Gl for α<n and β≥0.