Distinguished varieties in a family of domains associated with spectral interpolation and operator theory

Abstract

We find characterization for the distinguished varieties in the symmetrized polydisc Gn \; (n≥ 2) and thus generalize the work [J. Funct. Anal., 266 (2014), 5779 -- 5800] on G2 by the author and Shalit. We show that a distinguished variety in Gn is a part of an algebraic curve, which is a set-theoretic complete intersection, and that can be represented by the Taylor joint spectrum of n-1 commuting scalar matrices satisfying certain conditions. An n-tuple of commuting Hilbert space operators (S1, … ,Sn-1,P) for which n= Gn is a spectral set is called a n-contraction. To every n-contraction (S1, … ,Sn-1,P) there is a unique operator tuple (F1, … , Fn-1), called the FO-tuple of (S1, … ,Sn-1,P), satisfying \[ Si-Sn-i*P=DPFiDP \,, i=1, … ,n-1. \] We produce concrete functional model for the pure isometric-operator tuples associated with n and by an application of that model we establish that the n-contractions (S1, … ,Sn-1,P) and (S1*, … , Sn-1*,P*) admit normal ∂ -dilations for a unique distinguished variety in Gn, when is determined by the FO-tuple of (S1, … ,Sn-1, P). Further, we show that the dilation of (S1*, … ,Sn-1*,P*) is minimal and acts on the minimal unitary dilation space of P*. Also, we show interplay between the distinguished varieties in G2 and G3.