Ezio Vasselli
Published 2003-01-20, updated 2004-12-22Version 4
We construct the crossed product of a C(X)-algebra by an endomorphism, in such a way that the endomorphism itself becomes induced by the bimodule of continuous sections of a vector bundle. Some motivating examples for such a construction are given. Furthermore, we study the C*-algebra of G-invariant elements of the Cuntz-Pimsner algebra associated with a G-vector bundle, where G is a (noncompact, in general) group. In particular, the C*-algebra of invariant elements w.r.t. the action of the group of special unitaries of the given vector bundle is a crossed product in the above sense. We also study the analogous construction on certain Hilbert bimodules, called 'noncommutative pullbacks'.
Comments: 37 pages, uses xy. Revised version of the first part of the previous submission, to appear on Int. J. Math
Journal: Int.J.Math. 16 (2005) 137-172
Crossed products by endomorphisms, vector bundles and group duality, II
Crossed products of C(X)-algebras by endomorphisms and C(X)-categories
Cuntz-Pimsner C*-algebras and crossed products by Hilbert C*-bimodules
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