Hardy-Stein identities and Littlewood-Paley inequalities in a polydisc (Q944119)

\textit{D. H. Luecking} [Proc. Am. Math. Soc. 103, No. 3, 887--893 (1988; Zbl 0665.30035)] obtained the following generalization of the classical Littlewood-Paley inequality: if \(0< p\), \(s< m\), then \[ \int_{\mathbb{D}} |f(z)|^{p-s}|f'(z)|^s(1- |z|)^{s-1} dm_2(z)\leq C(p,s)\| f\|^p_{H^p} \] holds for all \(f\in H^p(D)\) if and only if \(2\leq s< p+ 2\), where \(m_2\) is the Lebesgue measure on \(\mathbb{D}\). In the present paper the authors obtain several inequalities of this type for functions holomorphic on the polydisc \(\mathbb{D}^n\) of \(\mathbb{C}^n\), also involving different radial weights in each variable and fractional derivatives.