Quantitative weighted estimates for rough singular integrals on homogeneous groups

Abstract

In this paper, we study weighted Lp(w) boundedness (1<p<∞ and w a Muckenhoupt Ap weight) of singular integrals with homogeneous convolution kernel K(x) on an arbitrary homogeneous group H of dimension Q, under the assumption that K0, the restriction of K to the unit annulus, is mean zero and Lq integrable for some q0<q≤ ∞, where q0 is a fixed constant depending on w. We obtain a quantitative weighted bound, which is consistent with the one obtained by Hyt\"onen--Roncal--Tapiola in the Euclidean setting, for this operator on Lp(w). Comparing to the previous results in the Euclidean setting, our assumptions on the kernel and on the underlying space are weaker. Moreover, we investigate the quantitative weighted bound for the bi-parameter rough singular integrals on product homogeneous Lie groups.