Fourier multipliers on a vector-valued function space

Abstract

We study multiplier theorems on a vector-valued function space, which is a generalization of the results of Calder\'on-Torchinsky and Grafakos-He-Honz\'ik-Nguyen, and an improvement of the result of Triebel. For 0<p<∞ and 0<q≤ ∞ we obtain that if r>ds-(d/(1,p,q)-d), then \( mk fk)\k∈NLp(lq)p,q l∈N ml(2l·)Lsr(Rd) \fk\k∈NLp(lq), ~~fk∈E(A2k), under the condition (|d/p-d/2|,|d/q-d/2|)<s<d/(1,p,q). An extension to p=∞ will be additionally considered in the scale of Triebel-Lizorkin space. Our result is sharp in the sense that the Sobolev space in the above estimate cannot be replaced by a smaller Sobolev space Lsr with r≤ ds-(d/(1,p,q)-d).