Ergodic Actions and Spectral Triples
Operator Algebras
2013-02-05 v1 Functional Analysis
Abstract
In this article, we give a general construction of spectral triples from certain Lie group actions on unital C*-algebras. If the group G is compact and the action is ergodic, we actually obtain a real and finitely summable spectral triple which satisfies the first order condition of Connes' axioms. This provides a link between the "algebraic" existence of ergodic action and the "analytic" finite summability property of the unbounded selfadjoint operator. More generally, for compact G we carefully establish that our (symmetric) unbounded operator is essentially selfadjoint. Our results are illustrated by a host of examples - including noncommutative tori and quantum Heisenberg manifolds.
Cite
@article{arxiv.1302.0426,
title = {Ergodic Actions and Spectral Triples},
author = {Olivier Gabriel and Martin Grensing},
journal= {arXiv preprint arXiv:1302.0426},
year = {2013}
}
Comments
18 pages