Factorization in weak products of complete Pick spaces

Abstract

Let H be a reproducing kernel Hilbert space with a normalized complete Nevanlinna-Pick (CNP) kernel. We prove that if (fn) is a sequence of functions in H with Σ\|fn\|2<∞, then there exists a contractive column multiplier (n) of H and a cyclic vector F∈ H so that n F=fn for all n. The space of weak products H H is the set of functions of the form h=Σi=1∞ figi with fi, gi∈ H and Σi=1∞ \|fi\|\|gi\|<∞. Using the above result, in combination with a recent result of Aleman, Hartz, McCarthy, and Richter, we show that for a large class of CNP spaces (including the Drury-Arveson spaces H2d and the Dirichlet space in the unit disk) every h∈ H H can be factored as a single product h=fg with f,g∈ H.