English

Functional Models for Commuting Hilbert-space Contractions

Functional Analysis 2022-07-08 v1

Abstract

We develop a Sz.-Nagy--Foias-type functional model for a commutative contractive operator tuple T=(T1,,Td)\underline{T} = (T_1, \dots, T_d) having T=T1TdT = T_1 \cdots T_d equal to a completely nonunitary contraction. We identify additional invariants G,W{\mathbb G}_\sharp, {\mathbb W}_\sharp in addition to the Sz.-Nagy--Foias characteristic function ΘT\Theta_T for the product operator TT so that the combined triple (G,W,ΘT)({\mathbb G}_\sharp, {\mathbb W}_\sharp, \Theta_T) becomes a complete unitary invariant for the original operator tuple T\underline{T}. For the case d3d \ge 3 in general there is no commutative isometric lift of T\underline{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 TT, generates a special kind of lift of T\underline{T}, herein called a {\em pseudo-commutative contractive lift} of T\underline{T}, which in turn leads to the functional model for T\underline{T}. This work has many parallels with recently developed model theories for symmetrized-bidisk contractions (commutative operator pairs (S,P)(S,P) having the symmetrized bidisk Γ\Gamma as a spectral set) and for tetrablock contractions (commutative operator triples (A,B,P)(A, B, P) having the tetrablock domain E{\mathbb E} as a spectral set).

Keywords

Cite

@article{arxiv.2207.03236,
  title  = {Functional Models for Commuting Hilbert-space Contractions},
  author = {Joseph A. Ball and Haripada Sau},
  journal= {arXiv preprint arXiv:2207.03236},
  year   = {2022}
}

Comments

Dedicated to the memory of Ron Douglas. It has appeared in Operator Theory: Advances and Applications (Ronald G. Douglas Memorial Volume)

R2 v1 2026-06-24T12:17:07.585Z