On decomposition of operators having 3 as a spectral set

Abstract

The symmetrized polydisc of dimension three is the set \[ 3 =\ (z1+z2+z3, z1z2+z2z3+z3z1, z1z2z3)\,:\, |zi|≤ 1 \,,\, i=1,2,3 \ ⊂eq C3\,. \] A triple of commuting operators for which 3 is a spectral set is called a 3-contraction. We show that every 3-contraction admits a decomposition into a 3-unitary and a completely non-unitary 3-contraction. This decomposition parallels the canonical decomposition of a contraction into a unitary and a completely non-unitary contraction. We also find new characterizations for the set 3 and 3-contractions.