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Global and local aspects of spectral actions

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arxiv 1201.6637 v1 pith:WKIBTUZC submitted 2012-01-31 math-ph hep-thmath.MP

Global and local aspects of spectral actions

classification math-ph hep-thmath.MP
keywords spectralactionactionsfieldheatkernelknownlambda
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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The principal object in noncommutatve geometry is the spectral triple consisting of an algebra A, a Hilbert space H, and a Dirac operator D. Field theories are incorporated in this approach by the spectral action principle, that sets the field theory action to Tr f(D^2/\Lambda^2), where f is a real function such that the trace exists, and \Lambda is a cutoff scale. In the low-energy (weak-field) limit the spectral action reproduces reasonably well the known physics including the standard model. However, not much is known about the spectral action beyond the low-energy approximation. In this paper, after an extensive introduction to spectral triples and spectral actions, we study various expansions of the spectral actions (exemplified by the heat kernel). We derive the convergence criteria. For a commutative spectral triple, we compute the heat kernel on the torus up the second order in gauge connection and consider limiting cases.

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Cited by 2 Pith papers

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  2. Spectral Noncommutative Geometry, Standard Model and all that

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    Review of spectral noncommutative geometry applied to the Standard Model, including bosonic and fermionic actions, Euclidean vs Lorentz issues, and going beyond the SM.