Automorphisms and the fundamental operators associated with the symmetrized tridisc

Abstract

The automorphisms of the symmetrized polydisc Gn are well-known and are given in the coordinates of the polydisc in E:Z. We find an explicit formula for the automorphisms of Gn in its own coordinates. If τ is an automorphism of Gn, then τ(S1,…,Sn-1,P) is a n-contraction, where a n-contraction is a commuting n-tuple of Hilbert space operators for which the closed symmetrized polydisc n is a spectral set. Corresponding to every n-contraction (S1,…,Sn-1,P), there exist n-1 unique operators A1,…,An-1 such that \[ Si-Sn-i*P=DPAiDP\,, DP=(I-P*P)1/2\,, \] for i=1,…, n-1. This unique (n-1)-tuple (A1,…,An-1), which is called the fundamental operator tuple or FO-tuple of (S1,…,Sn-1,P) in literature, plays central role in every section of operator theory on n. We find an explicit form of the FO-tuple of τ (S1,…,Sn-1,P) when n=3. We show by an example that a n-contraction may not have commuting FO-tuple. Also, we obtain a necessary and sufficient condition under which two n-contractions are unitarily equivalent.