Operators on Hilbert Space having E(3; 3; 1, 1, 1) and E(3; 2; 1, 2) as Spectral Sets

Abstract

A 7-tuple of commuting bounded operators T = (T1, …, T7) on a Hilbert space H is called a E(3; 3; 1, 1, 1) -contraction if E(3; 3; 1, 1, 1) is a spectral set for T. Let (S1, S2, S3) and (S1, S2) be tuples of commuting bounded operators defined on a Hilbert space H with SiSj = SjSi for 1 ≤slant i ≤slant 3 and 1 ≤slant j ≤slant 2. We say that S = (S1, S2, S3, S1, S2) is a E(3; 2; 1, 2) -contraction if E(3; 2; 1, 2) is a spectral set for S. We derive various properties of E(3; 3; 1, 1, 1)-contractions and E(3; 2; 1, 2)-contractions and establish a relationship between them. We discuss the fundamental equations for E(3; 3; 1, 1,1 )-contractions and E(3; 2; 1, 2)-contractions. We explore the structure of E(3; 3; 1, 1, 1)-unitaries and E(3; 2; 1, 2)-unitaries and elaborate on the relationship between them. We also study various properties of E(3; 3; 1, 1, 1)-isometries and E(3; 2; 1, 2)-isometries. We discuss the Wold Decomposition for a E(3; 3; 1, 1, 1)-isometry and a E(3; 2; 1, 2)-isometry. We further outline the structure theorem for a pure E(3; 3; 1, 1, 1)-isometry and a pure E(3; 2; 1, 2)-isometry.

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