On doubly commuting operators in C1, r class and quantum annulus

Abstract

For 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. We study the class of operators \[ C1,r = \ T : T is invertible and \|T\|, \|rT-1\| ≤ 1 \, \] introduced by Bello and Yakubovich. Any operator T for which the closed annulus Ar is a spectral set is in C1,r. The class C1, r is closely related to the quantum annulus which is given by \[ QAr = \ T : T is invertible and \|rT\|, \|rT-1\| ≤ 1 \. \] McCullough and Pascoe proved that an operator in QAr admits a dilation to an operator S satisfying (r-2 + r2)I - S*S - S-1S-* = 0. An analogous dilation result holds for operators in C1,r class. We extend these dilation results to doubly commuting tuples of operators in quantum annulus as well as in C1,r class. We also provide characterizations and decomposition results for such tuples.

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