Factorizations of Contractions

Abstract

The celebrated theorem of Berger, Coburn and Lebow on pairs of commuting isometries can be formulated as follows: a pure isometry V on a Hilbert space H is a product of two commuting isometries V1 and V2 in B(H) if and only if there exists a Hilbert space E, a unitary U in B(E) and an orthogonal projection P in B(E) such that (V, V1, V2) and (Mz, M, M) on H2E(D) are unitarily equivalent, where \[ (z)=(P+zP)U*\;and\; (z)=U(P+zP) \;;(z ∈ D). \] Here we prove a similar factorization result for pure contractions. More particularly, let T be a pure contraction on a Hilbert space H and let PQ Mz|Q be the Sz.-Nagy and Foias representation of T for some canonical Q ⊂eq H2D(D). Then T = T1 T2, for some commuting contractions T1 and T2 on H, if and only if there exists B(D)-valued polynomials and of degree ≤ 1 such that Q is a joint (M*, M*)-invariant subspace, \[PQ Mz|Q = PQ M |Q = PQ M |Q \; and \;(T1, T2) (PQ M|Q, PQ M|Q).\]