The Drury--Arveson space on the Siegel upper half-space and a von Neumann type inequality

Abstract

In this work we study what we call Siegel--dissipative vector of commuting operators (A1,…, Ad+1) on a Hilbert space H and we obtain a von Neumann type inequality which involves the Drury--Arveson space DA on the Siegel upper half-space U. The operator Ad+1 is allowed to be unbounded and it is the infinitesimal generator of a contraction semigroup \e-iτ Ad+1\τ<0. We then study the operator e-iτ Ad+1Aα where Aα=A1α1·s Aαdd for α∈ Nd0 and prove that can be studied by means of model operators on a weighted L2 space. To prove our results we obtain a Paley--Wiener type theorem for DA and we investigate some multiplier operators on DA as well.