Mixed estimates for singular integrals on weighted Hardy spaces (Q2206764)

In [J. Geom. Anal. 22, No. 3, 666--684 (2012; Zbl 1408.42009)] \textit{G. Lu} and \textit{Y. Zhu} proved the boundedness of singular integrals on weighted Hardy spaces \(H^p_w(\mathbb R^n)\) where \(0<p\le 1\) and \(w\) is a weight in the Muckenhoupt \(A_\infty\) class. Their results however fail to give explicit constants. In the present paper the authors provide precise quantitative norms for different kinds of singular integral operators on \(H^p_w,\, 0<p\le 1,\, w\in A_\infty\). This includes Fourier multiplier operators, Calderon-Zygmund operators of homogeneous type, and singular integrals of convolution type.