Functional Models for Commuting Hilbert-space Contractions
Abstract
We develop a Sz.-Nagy--Foias-type functional model for a commutative contractive operator tuple T = (T1, …, Td) having T = T1 ·s Td equal to a completely nonunitary contraction. We identify additional invariants G, W in addition to the Sz.-Nagy--Foias characteristic function T for the product operator T so that the combined triple ( G, W, T) becomes a complete unitary invariant for the original operator tuple T. For the case d 3 in general there is no commutative isometric lift of T; however there is a (not necessarily commutative) isometric lift having some additional structure so that, when compressed to the minimal isometric-lift space for the product operator T, generates a special kind of lift of T, herein called a pseudo-commutative contractive lift of T, which in turn leads to the functional model for T. This work has many parallels with recently developed model theories for symmetrized-bidisk contractions (commutative operator pairs (S,P) having the symmetrized bidisk as a spectral set) and for tetrablock contractions (commutative operator triples (A, B, P) having the tetrablock domain E as a spectral set).
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