Noncommutative geometry, superconnections and Riemannian gravity as a low-energy theory
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Publication:1807405
DOI10.1023/A:1026609531792zbMath0943.83024WikidataQ115335134 ScholiaQ115335134MaRDI QIDQ1807405
Publication date: 18 November 1999
Published in: General Relativity and Gravitation (Search for Journal in Brave)
Applications of Lie (super)algebras to physics, etc. (17B81) Quantization of the gravitational field (83C45) Geometry of quantum groups (58B32) Asymptotic procedures (radiation, news functions, (mathcal{H} )-spaces, etc.) in general relativity and gravitational theory (83C30)
Cites Work
- Superconnections and the Chern character
- Graded Lie algebras in mathematics and physics (Bose-Fermi symmetry)
- Integral Formalism for Gauge Fields
- Algebra and physics of the unitary multiplicity-free representations of ∼(SL)(4, R)
- Internal supersymmetry and unification
- Exterior gauging of an internal supersymmetry and SU (2/1) quantum asthenodynamics
- NONCOMMUTATIVE GEOMETRY AND GRADED ALGEBRAS IN ELECTROWEAK INTERACTIONS
- General relativity with spin and torsion: Foundations and prospects
- Superconnections and internal supersymmetry dynamics.
- Quadratic lagrangians and general relativity
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