Beurling quotient modules on the polydisc

Abstract

Let H2(Dn) denote the Hardy space over the polydisc Dn, n ≥ 2. A closed subspace Q ⊂eq H2(Dn) is called Beurling quotient module if there exists an inner function θ ∈ H∞(Dn) such that Q = H2(Dn) /θ H2(Dn). We present a complete characterization of Beurling quotient modules of H2(Dn): Let Q ⊂eq H2(Dn) be a closed subspace, and let Czi = PQ Mzi|Q, i=1, …, n. Then Q is a Beurling quotient module if and only if \[ (IQ - Czi* Czi) (IQ - Czj* Czj) = 0 (i ≠ j). \] We present two applications: first, we obtain a dilation theorem for Brehmer n-tuples of commuting contractions, and, second, we relate joint invariant subspaces with factorizations of inner functions. All results work equally well for general vector-valued Hardy spaces.