Asymptotically nonlocal gravity

Boos, Jens; Carone, Christopher D.

doi:10.1007/jhep06(2023)017

Cited by 3 publications

(1 citation statement)

References 55 publications

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“…Actions of the form (30) are moreover of relevance for the form-factor program in asymptotically safe quantum gravity [90][91][92]. As infinite-derivative expansions they appear in non-local ghostfree gravity [93][94][95][96][97][98], asymptotically non-local gravity [99] and as effective actions in loop quantum gravity [100,101]. The analysis of this paper suggests that actions of the form (30) are incompatible with a dynamical singularity-suppression principle, unless an equivalence to an action of infinite order in the curvature can be established.…”

Section: Discussionmentioning

confidence: 99%

Suppression of spacetime singularities in quantum gravity

Borissova

2024

Class. Quantum Grav.

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We investigate the requirement of suppressing spacetime geometries with a curvature singularity via destructive interference in the Lorentzian gravitational path integral as a constraint on the microscopic action for gravity. Based on simple examples of static spherically symmetric spacetimes, we demonstrate that complete singularity suppression in the path integral stipulates that the action for gravity be of infinite order in the curvature.

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Section: Discussionmentioning

confidence: 99%

Suppression of spacetime singularities in quantum gravity

Borissova

2024

Class. Quantum Grav.

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Note on scattering in asymptotically nonlocal theories

Carone,

Musser

2023

Phys. Rev. D

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Renormalisable Non-Local Quark–Gluon Interaction: Mass Gap, Chiral Symmetry Breaking and Scale Invariance

Chatterjee,

Frasca,

Ghoshal

et al. 2024

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We derive a Nambu–Jona-Lasinio (NJL) model from a non-local gauge theory and show that it has confining properties at low energies. In particular, we present an extended approach to non-local QCD and a complete revision of the technique of Bender, Milton and Savage applied to non-local theories, providing a set of Dyson–Schwinger equations in differential form. In the local case, we obtain closed-form solutions in the simplest case of the scalar field and extend it to the Yang–Mills field. In general, for non-local theories, we use a perturbative technique and a Fourier series and show how higher-order harmonics are heavily damped due to the presence of the non-local factor. The spectrum of the theory is analysed for the non-local Yang–Mills sector and found to be in agreement with the local results on the lattice in the limit of the non-locality mass parameter running to infinity. In the non-local case, we confine ourselves to a non-locality mass that is sufficiently large compared to the mass scale arising from the integration of the Dyson–Schwinger equations. Such a choice results in good agreement, in the proper limit, with the spectrum of the local theory. We derive a gap equation for the fermions in the theory that gives some indication of quark confinement in the non-local NJL case as well. Confinement seems to be a rather ubiquitous effect that removes some degrees of freedom in the original action, favouring the appearance of new observable states, as seen, e.g., for quantum chromodynamics at lower energies.

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Asymptotically nonlocal gravity

Cited by 3 publications

References 55 publications

Suppression of spacetime singularities in quantum gravity

Suppression of spacetime singularities in quantum gravity

Note on scattering in asymptotically nonlocal theories

Renormalisable Non-Local Quark–Gluon Interaction: Mass Gap, Chiral Symmetry Breaking and Scale Invariance

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