Multipliers and operator space structure of weak product spaces

Abstract

In the theory of reproducing kernel Hilbert spaces, weak product spaces generalize the notion of the Hardy space H1. For complete Nevanlinna-Pick spaces H, we characterize all multipliers of the weak product space H H. In particular, we show that if H has the so-called column-row property, then the multipliers of H and of H H coincide. This result applies in particular to the classical Dirichlet space and to the Drury-Arveson space on a finite dimensional ball. As a key device, we exhibit a natural operator space structure on H H, which enables the use of dilations of completely bounded maps.