Quantitative weighted bounds for Calder\'on commutator with rough kernel

Abstract

We consider weighted Lp(w) boundedness (1<p<∞ and w a Muckenhoupt Ap weight) of the Calder\'on commutator C associated with rough homogeneous kernel, under the condition ∈ Lq( Sn-1) for q0<q≤∞ with q0 a fixed constant depending on w. Comparing to the previous related known results (assuming ∈ L∞( Sn-1)), our result for ∈ Lq( Sn-1) with q in the range (q0,∞) is new. We also obtain a quantitative weighted bound for this C on Lp(w), which is the best known quantitative result for this class of operators.