Coefficient multipliers in \(H^ p\) spaces over bounded symmetric domains in \(\mathbb{C}^ n\) (Q1804891)

\textit{P. L. Duren} and \textit{A. L. Shields} [Pac. J. Math. 32, 69-78 (1970; Zbl 0187.377)] have obtained several results concerning sequences \(\lambda_k\) that multiply the coefficients of \(H^p\) functions into sequences in \(\ell^q\) for the case of one variable. The present paper is devoted to similar results for \(H^p\) spaces over bounded symmetric domains \(\Omega\) in \(\mathbb{C}^n\). These results are more complete when \(\Omega\) is the unit ball. There are also results concerning multipliers \(\lambda_k\) of \(H^p (\Omega)\) into \(H^q (\Omega)\) that depend upon the growth of means of the holomorphic function \(\sum \lambda_k z^k\) rather than upon the sequence \(\lambda_k\) itself.