On the topological interpretation of gravitational anomalies
Identifieur interne : 000578 ( Istex/Curation ); précédent : 000577; suivant : 000579On the topological interpretation of gravitational anomalies
Auteurs : Denis Perrot [France]Source :
- Journal of Geometry and Physics [ 0393-0440 ] ; 2001.
English descriptors
- KwdEn :
- Algebra, Anomaly, Anomaly formula, Associative algebra, Bott periodicity, Characteristic classes, Chern, Chern character, Cochains, Cohomology, Compact support, Conformal, Conformal anomalies, Conformal transformations, Connes, Cyclic, Cyclic cohomology, Diffeomorphisms, Differential algebra, Differential forms, Differential operator, Elsevier science, Equivariant, Equivariant cohomology, Equivariant cohomology class, Equivariant homology, Exterior algebra, Gauge group, Gauge theories, Ghost vector, Gravitational anomalies, Gravitational anomaly, Gravitational case, Homogeneous cochains, Homotopy quotient, Index theorem, Invariant forms, Inverse limit, Loop group, Matrix, Noncommutative geometry, Nontrivial, Nontrivial loops, Operator algebras, Orientationpreserving diffeomorphisms, Particular case, Perrot, Perrot journal, Pontrjagin classes, Pontrjagin ring, Principal bundle, Riemann surface, Riemann surfaces, Right composition, Structure group, Tensor product, Topological, Topological anomaly, Topological anomaly formula, Topological interpretation, Weil algebra.
- Teeft :
- Algebra, Anomaly, Anomaly formula, Associative algebra, Bott periodicity, Characteristic classes, Chern, Chern character, Cochains, Cohomology, Compact support, Conformal, Conformal anomalies, Conformal transformations, Connes, Cyclic, Cyclic cohomology, Diffeomorphisms, Differential algebra, Differential forms, Differential operator, Elsevier science, Equivariant, Equivariant cohomology, Equivariant cohomology class, Equivariant homology, Exterior algebra, Gauge group, Gauge theories, Ghost vector, Gravitational anomalies, Gravitational anomaly, Gravitational case, Homogeneous cochains, Homotopy quotient, Index theorem, Invariant forms, Inverse limit, Loop group, Matrix, Noncommutative geometry, Nontrivial, Nontrivial loops, Operator algebras, Orientationpreserving diffeomorphisms, Particular case, Perrot, Perrot journal, Pontrjagin classes, Pontrjagin ring, Principal bundle, Riemann surface, Riemann surfaces, Right composition, Structure group, Tensor product, Topological, Topological anomaly, Topological anomaly formula, Topological interpretation, Weil algebra.
Abstract
Abstract: We consider the mixed gravitational Yang–Mills anomaly as the coupling between the K-theory and K-homology of a C∗-algebra crossed product. The index theorem of Connes–Moscovici allows to compute the Chern character of the K-cycle by local formulae involving connections and curvatures. It gives a topological interpretation to the anomaly, in the sense of noncommutative algebras.
Url:
DOI: 10.1016/S0393-0440(01)00002-X
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ISTEX:1B415082CA2F85BD668B40FD53FD9DA836A39C45Le document en format XML
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<term>Bott periodicity</term>
<term>Characteristic classes</term>
<term>Chern</term>
<term>Chern character</term>
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<term>Compact support</term>
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<term>Conformal anomalies</term>
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<term>Tensor product</term>
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<term>Topological anomaly</term>
<term>Topological anomaly formula</term>
<term>Topological interpretation</term>
<term>Weil algebra</term>
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<term>Bott periodicity</term>
<term>Characteristic classes</term>
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<term>Equivariant cohomology</term>
<term>Equivariant cohomology class</term>
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<front><div type="abstract" xml:lang="en">Abstract: We consider the mixed gravitational Yang–Mills anomaly as the coupling between the K-theory and K-homology of a C∗-algebra crossed product. The index theorem of Connes–Moscovici allows to compute the Chern character of the K-cycle by local formulae involving connections and curvatures. It gives a topological interpretation to the anomaly, in the sense of noncommutative algebras.</div>
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