Sharp Hardy space estimates for multipliers
Abstract
We provide an improvement of Calder\'on and Torchinsky's version of the H\"ormander multiplier theorem on Hardy spaces Hp (0<p<∞), by replacing the Sobolev space Ls2(A0) by the Lorentz-Sobolev space Lsτ(s,p) ,(1,p) (A0), where τ(s,p) =ns-(n/(1,p)-n) and A0 is the annulus \ ∈ Rn: 1/2<||<2\. Our theorem also extends that of Grafakos and Slav\'ikov\'a to the range 0<p 1. Our result is sharp in the sense that the preceding Lorentz-Sobolev space cannot be replaced by a smaller Lorentz-Sobolev space Lr,qs(A0) with r< τ(s,p) or q>(1,p).
Turn this paper into a lesson
ArcXiv compiles a structured reading guide from this paper's metadata: plain-English importance, contributions, prerequisite concepts, which sections to read first, flashcards, and a quiz. Grounded in the abstract, never invented.