Some Exact Sequences for Toeplitz Algebras of Spherical Isometries
Abstract
A family \Tj\j∈ J of commuting Hilbert space operators is said to be a spherical isometry if Σj∈ JT*jTj=1 in the weak operator topology. We show that every commuting family F of spherical isometries has a commuting normal extension F. Moreover, if F is minimal, then there exists a natural short exact sequence 0 C C*( F) C*( F) 0 with a completely isometric cross-section, where C is the commutator ideal in C*( F). We also show that the space of Toeplitz operators associated to F is completely isometric to the commutant of the minimal normal extension F. Applications of these results are given for Toeplitz operators on strictly pseudoconvex or bounded symmetric domains.
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