Functional Models and Invariant Subspaces for Pairs of Commuting Contractions

Abstract

The goal of the present paper is to push Sz.-Nagy--Foias model theory for a completely nonunitary Hilbert-space contraction operator T, to the case of a commuting pair of contraction operators (T1, T2) having product T = T1 T2 which is completely nonunitary. The idea is to use the Sz.-Nagy-Foias functional model for T as the model space also for the commutative tuple (T1, T2) with T = T1 T2 equal to the usual Sz.-Nagy--Foias model operator, and identify what added structure is required to classify such commutative contractive factorizations T = T1 T2 up to unitary equivalence. In addition to the characteristic function T, we identify additional invariants ( G, W) which can be used to construct a functional model for the commuting pair (T1, T2) and which have good uniqueness properties: if two commutative contractive pairs (T1, T2) and (T'1, T'2) are unitarily equivalent, then their characteristic triples (, G, W)T and (, G, W)T' coincide in a natural sense. We illustrate the theory with several simple cases where the characteristic triples can be explicitly computed. This work extends earlier results of Berger-Coburn-Lebow B-C-L for the case where (T1, T2) is a pair of commuting isometries, and of Das-Sarkar D-S, Das-Sarkar-Sarkar D-S-S and the second author sauAndo for the case where T = T1T2 is pure (the operator sequence T*n tends strongly to 0). Finally we use the model to study the structure of joint invariant subspaces for a commutative, contractive operator pair, extending results of Sz.-Nagy--Foias for the single-operator case.