Classification of Drury-Arveson-type Hilbert modules associated with certain directed graphs

Abstract

Given a directed Cartesian product T of locally finite, leafless, rooted directed trees T1, …, Td of finite joint branching index, one may associate with T the Drury-Arveson-type C[z1, …, zd]-Hilbert module H ca( T) of vector-valued holomorphic functions on the open unit ball Bd in Cd, where a >0. In case all directed trees under consideration are without branching vertices, H ca( T) turns out to be the classical Drury-Arveson-type Hilbert module Ha associated with the reproducing kernel 1(1 - z, w)a defined on Bd. Unlike the case of d=1, the above association does not yield a reproducing kernel Hilbert module if we relax the assumption that T has finite joint branching index. The main result of this paper classifies all directed Cartesian product T for which the Hilbert modules H ca( T) are isomorphic in case a is a positive integer. One of the essential tools used to establish this isomorphism is an operator-valued representing measure arising from H ca( T). Further, a careful analysis of these Hilbert modules allows us to prove that the cardinality of the k th generation (k =0, 1, …) of T1, …, Td are complete invariants for H ca(·) provided ad ≠ 1. Failure of this result in case ad =1 may be attributed to the von Neumann-Wold decomposition for isometries. Along the way, we identify the joint cokernel E of the multiplication d-tuple Mz on H ca( T) with orthogonal direct sum of tensor products of certain hyperplanes.