On the boundedness of non-standard rough singular integral operators

Abstract

Let be homogeneous of degree zero, have vanishing moment of order one on the unit sphere Sd-1(d 2). In this paper, our object of investigation is the following rough non-standard singular integral operator T,\,Af(x)= p.\,v.∫Rd(x-y)|x-y|d+1(A(x)-A(y)-∇ A(y)(x-y))f(y) dy, where A is a function defined on Rd with derivatives of order one in BMO(Rd). We show that T,\,A enjoys the endpoint L L type estimate and is Lp bounded if ∈ L( L)2(Sd-1). These resuts essentially improve the previous known results given by Hofmann for the Lp boundedness of T,\,A under the condition ∈ Lq( Sd-1) (q>1), Hu and Yang for the endpoint weak L L type estimates when ∈ Lipα(Sd-1) for some α∈ (0,\,1]. Quantitative weighted strong and endpoint weak L L type inequalities are proved whenever ∈ L∞( Sd-1). The analysis of the weighted results relies heavily on two bilinear sparse dominations of T,\,A established herein.