B. Iochum, T. Masson, Th. Schücker, A. Sitarz
Published 2011-07-18Version 1
The aim of the paper is to answer the following question: does $\kappa$-deformation fit into the framework of noncommutative geometry in the sense of spectral triples? Using a compactification of time, we get a discrete version of $\kappa$-Minkowski deformation via $C^*$-algebras of groups. The dynamical system of the underlying groups (including some Baumslag--Solitar groups) is used in order to construct \emph{finitely summable} spectral triples. This allows to bypass an obstruction to finite-summability appearing when using the common regular representation.
Comments: Talk presented by B. Iochum at the conference "Geometry and Physics in Cracow", September 21-25, 2010
Journal: Acta Phys.Polon.Supp.4:305,2011
Discrete versions of some Dirac type equations and plane wave solutions
A discrete version of plane wave solutions of the Dirac equation in the Joyce form
Spectral triples and Toeplitz operators
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