Adjacent cross-sections of the commutant of Hilbert space operators

Abstract

Applying the techniques resulting the existence of almost invariant half-spaces, similarity models T can be given for upper triangular operator-matrices T= [matrixA&C\\ 0&Bmatrix]. The model T is also an operator-matrix, containing two diagonal operators in the general case ker25, and the unilateral shift S together with a diagonal operator in the particular case when A is similar to S ker26. Well-chosen compressions of operators in the commutant \ T\' form a linear manifold Ł satisfying the condition that every X∈ Ł is transformed into Y with Y 2 by a canonical mapping. Furthermore, a cyclcity property of \T\' yields transitivity of Ł. In ker25 and ker26 the 3-dimensional cross-sections of Ł have been investigated characterizing the canonical bases occurring in the corresponding subspaces of the matrix-algebra M3[]. In this paper new conditions are provided by studying matching of adjacent cross-sections.