Nijenhuis operators on homogeneous spaces related to C*-algebras
Abstract
For a unital non-simple C*-algebra A we consider its Banach--Lie group G of invertible elements. For a given closed ideal k in A, we consider the embedded Banach--Lie subgroup K of G of elements differing from the unit element by an element in k. We study vector bundle maps of the tangent space of the homogeneous space G/K, induced by an admissible bounded operator on A. In particular, we discuss when this vector bundle map is a Nijenhuis operator in G/K. The special case of almost complex structures in G/K is also addressed. Examples for particular classes of C*-algebras are presented, including the Toeplitz algebra and crossed products by Z.
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