All conditions for Stein-Weiss inequalities are necessary

Abstract

The famous Stein-Weiss inequality on Rn × Rn, also known as the doubly weighted Hardy-Littlewood-Sobolev inequality, asserts that \[ | Rn × Rn f(x) g(y)|x|α |x-y|λ |y|β dx dy | \| f \| Lp( Rn) \| g\| Lr( Rn) \] holds for any f∈ Lp( Rn) and g∈ Lr( Rn) under several conditions on the parameters n, p, r, α, β, and λ. Extending the above inequality to either different domains rather than Rn × Rn or classes of more general kernels rather than the classical singular kernel |x-y|-λ has been the subject of intensive studies over the last three decades. For example, Stein-Weiss inequalities on the upper half space, on the Heisenberg group, on homogeneous Lie group are known. Served as the first step, this work belongs to a set in which the following inequality on the product Rn-k × Rn is studied \[ | Rn × Rn-k f(x) g(y)|x|α |x-y|λ |y|β dx dy | \| f \| Lp( Rn-k) \| g\| Lr( Rn). \] Toward the validity of the above new inequality, in this work, by constructing suitable counter-examples, we establish all conditions for the parameters n, p, r, α, β, and λ necessarily for the validity of the above proposed inequality. Surprisingly, these necessary conditions applied to the case k=1 suggest that the existing Stein-Weiss inequalities on the upper half space are yet in the optimal range of the parameter λ. This could reflect limitations of the methods often used. Comments on the Stein-Weiss inequality on homogeneous Lie groups as well as the reverse form for Stein-Weiss inequalities are also made.

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