Characterizations and models for the C1,r class and quantum annulus

Abstract

For fixed 0<r<1, let Ar=\z ∈ C : r<|z|<1\ be the annulus with boundary ∂ Ar=T rT, where T is the unit circle in the complex plane C. An operator having Ar as a spectral set is called an Ar-contraction. Also, a normal operator with its spectrum lying in the boundary ∂ Ar is called an Ar-unitary. The C1,r class was introduced by Bello and Yakubovich in the following way: \[ C1, r=\T: T \ is invertible and \ \|T\|, \|rT-1\| ≤ 1\. \] McCullough and Pascoe defined the quantum annulus Q Ar by \[ Q Ar = \T \,:\, T is invertible and \, \|rT\|, \|rT-1\| ≤ 1 \. \] If Ar denotes the set of all Ar-contractions, then Ar ⊂neq C1,r ⊂neq Q Ar. We first find a model for an operator in C1,r and also characterize the operators in C1,r in several different ways. We prove that the classes C1,r and Q Ar are equivalent. Then, via this equivalence, we obtain analogous model and characterizations for an operator in Q Ar.