Fixed-topology Lorentzian triangulations: Quantum Regge Calculus in the Lorentzian domain
DOI10.1007/JHEP11(2011)072zbMath1306.83029arXiv1108.4965OpenAlexW2018881846WikidataQ59619493 ScholiaQ59619493MaRDI QIDQ2261137
Publication date: 6 March 2015
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1108.4965
Quantization of the gravitational field (83C45) Path integrals in quantum mechanics (81S40) Lattice gravity, Regge calculus and other discrete methods in general relativity and gravitational theory (83C27) Global differential geometry of Lorentz manifolds, manifolds with indefinite metrics (53C50) Triangulation and topological properties of semi-analytic andsubanalytic sets, and related questions (32B25)
Related Items (8)
Cites Work
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- Quantum gravity, dynamical triangulations and higher-derivative regularization
- A trace class operator inequality
- Edge lengths determining tetrahedrons
- Non-perturbative Lorentzian quantum gravity, causality and topology change
- Phases of simplicial quantum gravity in four dimensions. Estimates for the critical exponents
- Realizability of the Lorentzian \((n, 1)\)-simplex
- Incomplete Bessel, generalized incomplete gamma, or leaky aquifer functions
- Wormholes, baby universes, and causality
- Renormalization group flow in CDT
- INCOMPLETE BESSEL FUNCTIONS. I
- Quantum Regge calculus in the Lorentzian domain and its Hamiltonian formulation
- Spikes in quantum Regge calculus
- Recent progress in Regge calculus
- Dynamically triangulating Lorentzian quantum gravity
- A matrix trace inequality
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