Characterization of multipliers on vector-valued Hardy spaces

Abstract

This work characterizes the multipliers on vector-valued Hardy spaces over the infinite polydisk and the infinite polytorus, as well as in the context of Dirichlet series. Unlike the scalar-valued setting, where these frameworks are completely analogous reformulations of one another, there are significant differences in the vector-valued context. We prove that while the space of multipliers on the infinite polydisk is H∞(D∞2, B(X)), the situation on the infinite polytorus is distinct; assuming X is separable, the multiplier space can be identified as H∞sot(T∞, B(X)), consisting of essentially bounded SOT-measurable functions. These spaces coincide when X possesses the analytic Radon-Nikodym property. Finally, we extend these results to the associated Hardy spaces of Dirichlet series, Hp+(X) and Hp(X), providing characterizations for their respective multiplier spaces.

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