Multiple vector-valued, mixed norm estimates for Littlewood-Paley square functions

Abstract

We prove that for any LQ-valued Schwartz function f defined on Rd, one has the multiple vector-valued, mixed norm estimate \| f \|LP(LQ) \| S f \|LP(LQ) valid for every d-tuple P and every n-tuple Q satisfying 0 < P, Q < ∞ componentwise. Here S:= Sd1 ... SdN is a tensor product of several Littlewood-Paley square functions Sdj defined on arbitrary Euclidean spaces Rdj for 1≤ j≤ N, with the property that d1 + ... + dN = d. This answers a question that came up implicitly in our recent works and completes in a natural way classical results of the Littlewood-Paley theory. The proof is based on the helicoidal method introduced by the authors.