Dilation, functional model and a complete unitary invariant for C.0\,\; n-contractions

Abstract

A commuting tuple of operators (S1,…, Sn-1,P), defined on a Hilbert space H, for which the closed symmetrized polydisc \[ n =\ (Σ1≤ i≤ n zi,Σ1≤ i<j≤ nzizj,…, Πi=1n zi ): \,|zi|≤ 1, i=1,…,n \ \] is a spectral set, is called a n-contraction. A n-contraction is said to be pure or C.0 if P is C.0, that is, if P*n → 0 strongly as n → ∞. We show that for any n-contraction (S1,…, Sn-1,P), there is a unique operator tuple (A1,… , An-1) that satisfies the operator identities \[ Si-Sn-i*P=DPAiDP\,, i=1,…, n-1. \] This unique tuple is called the fundamental operator tuple or FO-tuple of (S1,…, Sn-1,P). With the help of the FO-tuple, we construct an operator model for a C.0 \; n-contraction and show that there exist n-1 operators C1,…, Cn-1 such that each Si can be represented as Si=Ci+PCn-i*. We find an explicit minimal dilation for a class of C.0 \; n-contractions whose FO-tuples satisfy a certain condition. Also we establish that the FO-tuple of (S1*,…, Sn-1*,P*) together with the characteristic function of P constitute a complete unitary invariant for the C.0 n-contractions. The entire program is an analogue of the Nagy-Foias theory for C.0 contractions.