Cartan subalgebras of operator ideals

Abstract

Denote by U I( H) the group of all unitary operators in 1+ I where H is a separable infinite-dimensional complex Hilbert space and I is any two-sided ideal of B( H). A Cartan subalgebra C of I is defined in this paper as a maximal abelian self-adjoint subalgebra of~ I and its conjugacy class is defined herein as the set of Cartan subalgebras \V C V* V∈ U I( H)\. For nonzero proper ideals I we construct an uncountable family of Cartan subalgebras of I with distinct conjugacy classes. This is in contrast to the by now classical observation of P. de La Harpe who noted that when I is any of the Schatten ideals, there is precisely one conjugacy class under the action of the full group of unitary operators on~ B. In the case when I is a symmetrically normed ideal and is the dual of some Banach space, we show how the conjugacy classes of the Cartan subalgebras of I become smooth manifolds modeled on suitable Banach spaces. These manifolds are endowed with groups of smooth transformations given by the action of the group U I( H) on the orbits, and are equivariantly diffeomorphic to each other. We then find that there exists a unique diffeomorphism class of full flag manifolds of U I( H) and we give its construction.