Supergravity black holes and billiards and the Liouville integrable structure associated with Borel algebras
From MaRDI portal
Publication:364972
DOI10.1007/JHEP03(2010)066zbMath1271.83080arXiv0903.2559OpenAlexW3122363386WikidataQ125942569 ScholiaQ125942569MaRDI QIDQ364972
Alexander S. Sorin, Pietro Giuseppe Fré
Publication date: 3 September 2013
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0903.2559
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (7)
Integrability of supergravity black holes and new tensor classifiers of regular and nilpotent orbits ⋮ Supergravity black holes and billiards and the Liouville integrable structure associated with Borel algebras ⋮ Black holes as generalised Toda molecules ⋮ Tunable Orbits Influence in a Driven Stadium-Like Billiard ⋮ Black holes in supergravity and integrability ⋮ Extremal multicenter black holes: nilpotent orbits and Tits Satake universality classes ⋮ Thec-map, Tits Satake subalgebras and the search for N=2 inflaton potentials
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Supergravity black holes and billiards and the Liouville integrable structure associated with Borel algebras
- Non-supersymmetric attractor flow in symmetric spaces
- The full integration of black hole solutions to symmetric supergravity theories
- The integration algorithm of Lax equation for both generic Lax matrices and generic initial conditions
- Einstein billiards and overextensions of finite-dimensional simple Lie algebras
- Solvable Lie algebras in type IIA, type IIB and M-theories
- Cosmological backgrounds of superstring theory and solvable algebras: oxidation and branes
- Exact solutions for Bianchi type cosmological metrics, Weyl orbits of \(E_{8(8)}\) subalgebras and \(p\)-branes
- Integrability of supergravity billiards and the generalized Toda lattice equations
- Cosmic billiards with painted walls in non-maximal supergravities: a worked out example
- The general pattern of Kac-Moody extensions in supergravity and the issue of cosmic billiards
- Generating geodesic flows and supergravity solutions
- The Weyl group and asymptotics: all supergravity billiards have a closed form general integral
- 4-dimensional black holes from Kaluza-Klein theories
- R-R scalars, \(U\)-duality and solvable Lie algebras
- \(E_{7(7)}\) duality, BPS black-hole evolution and fixed scalars
- \(N=8\) gaugings revisited: an exhaustive classification.
- \(N=8\) BPS black holes with \(1/2\) or \(1/4\) supersymmetry and solvable Lie algebra decompositions
- Homogeneous Kähler manifolds and T-algebras in \(N=2\) supergravity and superstrings
- Toda hierarchy with indefinite metric
- Alekseevskian spaces
- Iso-spectral deformations of general matrix and their reductions on Lie algebras
- Symmetry structure of special geometries
- Poincaré duality and \(G^{+++}\) algebras
- Non-semisimple gaugings of D = 5, 𝒩 = 8 supergravity and FDAs
- REGULAR R–R AND NS–NS BPS BLACK HOLES
- Non-semisimple Gaugings of D = 5 N = 8 Supergravity
- Billiard representation for multidimensional cosmology with intersecting p-branes near the singularity
- Tits–Satake projections of homogeneous special geometries
- The toda flow on a generic orbit is integrable
- COMPLETELY INTEGRABLE HAMILTONIAN SYSTEMS ON A GROUP OF TRIANGULAR MATRICES
- CLASSIFICATION OF QUATERNIONIC SPACES WITH A TRANSITIVE SOLVABLE GROUP OF MOTIONS
- Cosmological billiards
- Dirichlet Branes and Ramond-Ramond Charges
- N = 8 BPS black holes preserving 1/8 supersymmetry
- Cosmological billiards and oxidation
- The generating solution of regular N = 8 BPS black holes
- COSMOLOGICAL SINGULARITIES, EINSTEIN BILLIARDS AND LORENTZIAN KAC–MOODY ALGEBRAS
- Regular BPS black holes: Macroscopic and microscopic description of the generating solution
- Hyperbolic Kac-Moody algebras and chaos in Kaluza-Klein models
This page was built for publication: Supergravity black holes and billiards and the Liouville integrable structure associated with Borel algebras
