Bilinear endpoint estimates for Calder\'on commutator with rough kernel

Abstract

In this paper, we establish some bilinear endpoint estimates of Calder\'on commutator C[∇ A,f](x) with a homogeneous kernel when ∈ L+L(Sd-1). More precisely, we prove that C[∇ A,f] maps Lq(Rd)× L1(Rd) to Lr,∞(Rd) if q>d which improves previous result essentially. If q=d, we show that Calder\'on commutator maps Ld,1(Rd)× L1(Rd) to Lr,∞(Rd) which is new even if the kernel is smooth. The novelty in the paper is that we prove a new endpoint estimate of the Mary Weiss maximal function which may have its own interest in the theory of singular integral.