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FROM ENDOMORPHISMS TO AUTOMORPHISMS AND BACK: DILATIONS AND FULL CORNERS

Published online by Cambridge University Press:  01 June 2000

MARCELO LACA
MARCELO LACA
Affiliation:
Department of Mathematics, University of Newcastle, NSW 2308, Australia; marcelo@math.newcastle.edu.au
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Abstract

When S is a discrete subsemigroup of a discrete group G such that G = S−1S, it is possible to extend circle-valued multipliers from S to G, to dilate (projective) isometric representations of S to (projective) unitary representations of G, and to dilate/extend actions of S by injective endomorphisms of a C*-algebra to actions of G by automorphisms of a larger C*-algebra. These dilations are unique provided they satisfy a minimality condition. The (twisted) semigroup crossed product corresponding to an action of S is isomorphic to a full corner in the (twisted) crossed product by the dilated action of G. This shows that crossed products by semigroup actions are Morita equivalent to crossed products by group actions, making powerful tools available to study their ideal structure and representation theory. The dilation of the system giving the Bost–Connes Hecke C*-algebra from number theory is constructed explicitly as an application: it is the crossed product C0([Aopf ]f)[rtimes ]ℚ*+, corresponding to the multiplicative action of the positive rationals on the additive group [Aopf ]f of finite adeles.

Type
Research Article
Information
Journal of the London Mathematical Society , Volume 61 , Issue 3 , June 2000 , pp. 893 - 904
Copyright
The London Mathematical Society 2000

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