Lp(Rd) boundedness for the Calder\'on commutator with rough kernel

Abstract

Let k∈N, be homogeneous of degree zero, integrable on Sd-1 and have vanishing moment of order k, a be a function on Rd such that ∇ a∈ L∞(Rd), and T,\,a;k be the d-dimensional Calder\'on commutator defined by T,\,a;kf(x)= p.\,v.∫Rd(x-y)|x-y|d+k(a(x)-a(y))kf(y)dy. In this paper, the authors prove that if ζ∈ Sd-1∫Sd-1|(θ)| β (1|θ·ζ|)dθ<∞, with β∈(1,\,∞], then for 2β2β-1<p<2β, T,\,a;\,k is bounded on Lp(Rd).