Multilinear estimates for Calder\'on commutators

Abstract

In this paper, we investigate the multilinear boundedness properties of the higher (n-th) order Calder\'on commutator for dimensions larger than two. We establish all multilinear endpoint estimates for the target space Ldd+n,∞(Rd), including that Calder\'on commutator maps the product of Lorentz spaces Ld,1(Rd)×·s× Ld,1(Rd)× L1(Rd) to Ldd+n,∞(Rd), which is the higher dimensional nontrivial generalization of the endpoint estimate that the n-th order Calder\'on commutator maps L1(R)×·s× L1(R)× L1(R) to L11+n,∞(R). When considering the target space Lr(Rd) with r<dd+n, some counterexamples are given to show that these multilinear estimates may not hold. The method in the present paper seems to have a wide range of applications and it can be applied to establish the similar results for Calder\'on commutator with a rough homogeneous kernel.