Minimal isometric dilations and operator models for the polydisc

Abstract

For commuting contractions T1,… ,Tn acting on a Hilbert space H with T=Πi=1n Ti, we find a necessary and sufficient condition under which (T1,… ,Tn) dilates to commuting isometries (V1,… ,Vn) on the minimal isometric dilation space T, where V=Πi=1nVi is the minimal isometric dilation of T. We construct both Schaffer and Sz. Nagy-Foias type isometric dilations for (T1,… ,Tn) on the minimal dilation spaces of T. Also, a different dilation is constructed when the product T is a C.0 contraction, that is T*n → 0 as n → ∞. As a consequence of these dilation theorems we obtain different functional models for (T1,… ,Tn) in terms of multiplication operators on vectorial Hardy spaces. One notable fact about our models is that the multipliers are analytic functions in one variable. The dilation, when T is a C.0 contraction, leads to a conditional factorization of a T. Several examples have been constructed.