Spaces of Dirichlet series with the complete Pick property

Abstract

We consider reproducing kernel Hilbert spaces of Dirichlet series with kernels of the form k(s,u) = Σ an n-s- u, and characterize when such a space is a complete Pick space. We then discuss what it means for two reproducing kernel Hilbert spaces to be "the same", and introduce a notion of weak isomorphism. Many of the spaces we consider turn out to be weakly isomorphic as reproducing kernel Hilbert spaces to the Drury-Arveson space H2d in d variables, where d can be any number in \1,2,…, ∞\, and in particular their multiplier algebras are unitarily equivalent to the multiplier algebra of H2d. Thus, a family of multiplier algebras of Dirichlet series are exhibited with the property that every complete Pick algebra is a quotient of each member of this family. Finally, we determine precisely when such a space of Dirichlet series is weakly isomorphic to H2d and when its multiplier algebra is isometrically isomorphic to Mult(H2d).