Add to ORKG4 pagesConnes' formula defines a distance in loop quantum gravity, via the spinfoam Dirac operator. A simple notion of spectral distance on a graph can be extended do the discrete Lorentzian context, providing a physically natural example of Lorentzian spectral geometry, with a neat space of Dirac operators. The Hilbert structure of the fermion space is Lorentz covariant rather than invariant
We study the distance between symmetry-violating quantum field theories and the surface of symmetric...
The Hamiltonian constraint is the key element of the canonical formulation of loop quantum gravity (...
A phenomenology for the deep spatial geometry of loop quantum gravity is introduced. In the context ...
4 pagesConnes' formula defines a distance in loop quantum gravity, via the spinfoam Dirac operator. ...
25 pages, RevTeXA common misconception is that Lorentz invariance is inconsistent with a discrete sp...
6 pages, 1 figureInternational audienceThe kinematics of loop gravity can be given a manifestly Lore...
RevTex, 13 pages, v2: references addedWe study the spectrum of the length and area operators in Lore...
Inspired by previous work in (2 + 1)-dimensional quantum gravity, which found evidence for a discret...
13 pages, review, draft chapter for the book "Approaches to quantum gravity", being prepared by Dani...
33 pages, 12 figures; NPB versionInternational audienceThe dual picture of quantum geometry provided...
One of the celebrated results of Loop Quantum Gravity (LQG) is the discreteness of the spectrum of g...
International audienceIn this work, we study the classical and quantum properties of the unique comm...
We introduce an analogue of the theory of length spaces into the setting of Lorentzian geometry and ...
9 pagesWe generalize a model recently proposed for Euclidean quantum gravity to the case of Lorentzi...
Restricted Access. An open-access version is available at arXiv.org (one of the alternative location...
We study the distance between symmetry-violating quantum field theories and the surface of symmetric...
The Hamiltonian constraint is the key element of the canonical formulation of loop quantum gravity (...
A phenomenology for the deep spatial geometry of loop quantum gravity is introduced. In the context ...
4 pagesConnes' formula defines a distance in loop quantum gravity, via the spinfoam Dirac operator. ...
25 pages, RevTeXA common misconception is that Lorentz invariance is inconsistent with a discrete sp...
6 pages, 1 figureInternational audienceThe kinematics of loop gravity can be given a manifestly Lore...
RevTex, 13 pages, v2: references addedWe study the spectrum of the length and area operators in Lore...
Inspired by previous work in (2 + 1)-dimensional quantum gravity, which found evidence for a discret...
13 pages, review, draft chapter for the book "Approaches to quantum gravity", being prepared by Dani...
33 pages, 12 figures; NPB versionInternational audienceThe dual picture of quantum geometry provided...
One of the celebrated results of Loop Quantum Gravity (LQG) is the discreteness of the spectrum of g...
International audienceIn this work, we study the classical and quantum properties of the unique comm...
We introduce an analogue of the theory of length spaces into the setting of Lorentzian geometry and ...
9 pagesWe generalize a model recently proposed for Euclidean quantum gravity to the case of Lorentzi...
Restricted Access. An open-access version is available at arXiv.org (one of the alternative location...
We study the distance between symmetry-violating quantum field theories and the surface of symmetric...
The Hamiltonian constraint is the key element of the canonical formulation of loop quantum gravity (...
A phenomenology for the deep spatial geometry of loop quantum gravity is introduced. In the context ...