On Quotient modules of H2(Dn): Essential Normality and Boundary Representations

Abstract

Let Dn be the open unit polydisc in Cn, n ≥ 1, and let H2(Dn) be the Hardy space over Dn. For n 3, we show that if θ ∈ H∞(Dn) is an inner function, then the n-tuple of commuting operators (Cz1, …, Czn) on the Beurling type quotient module Qθ is not essentially normal, where \[Qθ = H2(Dn)/ θ H2(Dn) and Czj = PQθ Mzj|Qθ (j = 1, …, n).\] Rudin's quotient modules of H2(D2) are also shown to be not essentially normal. We prove several results concerning boundary representations of C*-algebras corresponding to different classes of quotient modules including doubly commuting quotient modules and homogeneous quotient modules.