Spectral Action on SU q (2)

Iochum, Bruno; Lévy, Cyril; Sitarz, Andrzej

doi:10.1007/s00220-009-0810-8

Cited by 10 publications

(12 citation statements)

References 37 publications

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“…Yet, the latter is not a single number but rather a dimension spectrum [13,29], which is a (possibly infinite) discrete subset of the complex plane with finite multiplicities allowed. The dimension spectrum has been computed for various commutative [3,13,14,29,30,36] and noncommutative spectral triples [5,18,21,24,27,28,30,43] including the quantum group SU q (2) [12,19] and some of the Podleś spheres [18] (see also [16]). One of the significant features of almost all spectral triples for the q-deformations of manifolds is the discrepancy between the homological and metric dimensions.…”

Section: Introductionmentioning

confidence: 99%

Heat Trace and Spectral Action on the Standard Podleś Sphere

Eckstein

Iochum

Sitarz

2014

Commun. Math. Phys.

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Section: Introductionmentioning

confidence: 99%

Heat Trace and Spectral Action on the Standard Podleś Sphere

Eckstein

Iochum

Sitarz

2014

Commun. Math. Phys.

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“…When M has a boundary, some a 0 k are non-zero, the dimension spectrum can be non simple (even if it is simple for the Dirac operator, see for instance [40].) On a spectral triple .A; H ; D/, the fact to change the product on A may or not affect the dimension spectrum: for instance, there is no change when one goes from the commutative torus to the noncommutative one (see [19]), while the dimension spectrum of SU q .2), which is bounded from below, does not coincide with the dimension spectrum of the sphere S 3 corresponding to q D 1; see [33], Corollary 4.10.…”

Section: Tadpole-like Integrals the Goal Of This Section Is Tomentioning

confidence: 99%

“…This map is of course a trace on A for a commutative geometry. But for the triple associated to SU q .2/ this not a trace since (see [33]) Note that the notion of pseudodifferential operator is modified as ‰.A/ now includes J AJ 1 ; see [19]. …”

Section: This Is Why the Einstein-hilbert Actionmentioning

confidence: 99%

“…For examples of spectral action in the real noncommutative setting, see [9], [6], [37] for the case of almost commutative instances which pops up in particle physics, [21] for the Moyal plane (and few points for non-compact manifolds [22]), [23], [19] for the noncommutative torus, and [33] for the quantum group SU q .2/. In the latter case there are tadpoles.…”

Section: Introductionmentioning

confidence: 99%

“…This proposition does not survive in noncommutative spectral triples, see for instance [33], Table 1.…”

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confidence: 99%

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Tadpoles and commutative spectral triples

Iochum¹,

Lévy²

2011

J. Noncommut. Geom.

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Noncommutative geometry as a framework for unification of all fundamental interactions including gravity. Part I.

Chamseddine

Connes

2010

Fortschritte der Physik

132

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We examine the hypothesis that space-time is a product of a continuous four-dimensional manifold times a finite space. A new tensorial notation is developed to present the various constructs of noncommutative geometry. In particular, this notation is used to determine the spectral data of the standard model. The particle spectrum with all of its symmetries is derived, almost uniquely, under the assumption of irreducibility and of dimension 6 modulo 8 for the finite space. The reduction from the natural symmetry group SU (2) × SU (2) × SU (4) to U (1) × SU (2) × SU (3) is a consequence of the hypothesis that the two layers of space-time are finite distance apart but is non-dynamical. The square of the Dirac operator, and all geometrical invariants that appear in the calculation of the heat kernel expansion are evaluated. We re-derive the leading order terms in the spectral action. The geometrical action yields unification of all fundamental interactions including gravity at very high energies. We make the following predictions: (i) The number of fermions per family is 16. There is a right-handed neutrino with a see-saw mechanism. Moreover, the zeroth order spectral action obtained with a cut-off function is consistent with experimental data up to few percent. We discuss a number of open issues. We prepare the ground for computing higher order corrections since the predicted mass of the Higgs field is quite sensitive to the higher order corrections. We speculate on the nature of the noncommutative space at Planckian energies and the possible role of the fundamental group for the problem of generations.

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Spectral Action on SU q (2)

Abstract: The spectral action on the equivariant real spectral triple over A SU q (2) is computed explicitly. Properties of the differential calculus arising from the Dirac operator are studied and the results are compared to the commutative case of the sphere S 3 .

Cited by 10 publications

References 37 publications

Heat Trace and Spectral Action on the Standard Podleś Sphere

Heat Trace and Spectral Action on the Standard Podleś Sphere

Tadpoles and commutative spectral triples

Noncommutative geometry as a framework for unification of all fundamental interactions including gravity. Part I.

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