Anisotropic Singular Integrals in Product Spaces

Abstract

Let Ai for i=1, 2 be an expansive dilation, respectively, on Rn and Rm and A(A1, A2). Denote by A∞(; A) the class of Muckenhoupt weights associated with A. The authors introduce a class of anisotropic singular integrals on Rn× Rm, whose kernels are adapted to A in the sense of Bownik and have vanishing moments defined via bump functions in the sense of Stein. Then the authors establish the boundedness of these anisotropic singular integrals on Lqw( Rn× Rm) with q∈(1, ∞) and w∈ Aq( Rn× Rm; A) or on Hpw( Rn× Rm; A) with p∈(0, 1] and w∈ A∞( Rn × Rm; A). These results are also new even when w=1.