Sharp Hardy-Littlewood-Sobolev inequalities on compact CR manifold

Abstract

Assume that M is a CR compact manifold without boundary and CR Yamabe invariant Y(M) is positive. Here, we devote to study a class of sharp Hardy-Littlewood-Sobolev inequality as follows equation* | ∫M∫M [Gθ(η)]Q-αQ-2 f() g(η) dVθ() dVθ(η) | ≤ Yα(M) \|f\|L2QQ+α(M) \|g\|L2QQ+α(M), equation* where Gθ(η) is the Green function of CR conformal Laplacian Lθ=bnb+R, Yα(M) is sharp constant, b is Sublaplacian and R is Tanaka-Webster scalar curvature. For the diagonal case f=g, we prove that Yα(M)≥ Yα(S2n+1) (the unit complex sphere of Cn+1) and Yα(M) can be attained if Yα(M)> Yα(S2n+1). Particular, if α=2, the previous extremal problem is closely related to the CR Yamabe problem. Hence, we can study the CR Yamabe problem by integral equations.