The symmetrization map and -contractions
Abstract
The symmetrization map π: C2→ C2 is defined by π(z1,z2)=(z1+z2,z1z2). The closed symmetrized bidisc is the symmetrization of the closed unit bidisc D2, that is, \[ = π( D2)=\ (z1+z2,z1z2)\,:\, |zi|≤ 1, i=1,2 \. \] A pair of commuting Hilbert space operators (S,P) for which is a spectral set is called a -contraction. Unlike the scalars in , a -contraction may not arise as a symmetrization of a pair of commuting contractions, even not as a symmetrization of a pair of commuting bounded operators. We characterize all -contractions which are symmetrization of pairs of commuting contractions. We show by constructing a family of examples that even if a -contraction (S,P)=(T1+T2,T1T2) for a pair of commuting bounded operators T1,T2, no real number less than 2 can be a bound for the set \ \|T1\|,\|T2\| \ in general. Then we prove that every -contraction (S,P) is the restriction of a -contraction ( S, P) to a common reducing subspace of S, P and that ( S, P)=(A1+A2,A1A2) for a pair of commuting operators A1,A2 with \\|A1\|, \|A2\|\ ≤ 2. We find new characterizations for the -unitaries and describe the distinguished boundary of in a different way. We also show some interplay between the fundamental operators of two -contractions (S,P) and (S1,P).
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