The degrees of freedom of area Regge calculus: dynamics, non-metricity, and broken diffeomorphisms

Asante, Seth K.; Dittrich, Bianca; Haggard, Hal M.

doi:10.1088/1361-6382/aac588

Cited by 25 publications

(39 citation statements)

References 185 publications

(470 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Previous investigations [17,18] only allowed for quasilocal fluctuation of the metric which are, in the semiclassical limit, expected to turn to gauge degrees of freedom. It can be expected that these appear in the theory as spurious degrees of freedom, since it is well-known that the gauge symmetry of GR is broken in the EPRL model [45,73,77].…”

Section: Discussionmentioning

confidence: 99%

“…In particular, in [45], it was observed that the EPRL model breaks vertex displacement symmetry, which is the manifestation of diffeomorphisms on the lattice [45,[73][74][75][76][77]. While this breaking of symmetry is well-known in classical Regge calculus, where it appears whenever curvature is involved, the quantum theory breaks it even in the case of flat metrics.…”

Section: A One Dimensional Isochoric Rg Flowmentioning

confidence: 99%

See 1 more Smart Citation

Renormalization of symmetry restricted spin foam models with curvature in the asymptotic regime

2018

View full text Add to dashboard Cite

We study the renormalization group flow of the Euclidean Engle-Pereira-Rovelli-Livine and Freidel-Krasnov (EPRL-FK) spin foam model in the large-j-limit. The vertex amplitude is deformed to include a cosmological constant term. The state sum is reduced to describe a foliated spacetime whose spatial slices are flat, isotropic and homogeneous. The model admits a non-vanishing extrinsic curvature whereas the scale factor can expand or contract at successive time steps. The reduction of degrees of freedom allows a numerical evaluation of certain geometric observables on coarser and finer discretizations. Their comparison defines the renormalization group (RG) flow of the model in the parameters (α, Λ, G). We first consider the projection of the RG flow along the α direction, which shows a UV-attractive fixed point. Then, we extend our analysis to two-and three-dimensional parameter spaces. Most notably, we find the indications of a fixed point in the (α, Λ, G) space showing one repulsive and two attractive directions. arXiv:1804.00023v3 [gr-qc]

show abstract

Section: Discussionmentioning

confidence: 99%

Section: A One Dimensional Isochoric Rg Flowmentioning

confidence: 99%

Renormalization of symmetry restricted spin foam models with curvature in the asymptotic regime

2018

View full text Add to dashboard Cite

show abstract

“…To this end, one uses versions of Regge calculus based on other sets of variables than the edge lengths, e.g. areas and angles [41,45,69,81]. Another choice, possibly more suited for Lorentzian signature, would be variables related to spinors or twistors [82,83].…”

Section: Discussionmentioning

confidence: 99%

“…Turning on curvature, for instance by changing the boundary data, these eigenvalues will no longer vanish and will scale with the amount of curvature, as determined by the deficit angles [37,38]. A similar effect arises in the presence of torsion [45].…”

Section: Regge Calculusmentioning

confidence: 99%

Holographic description of boundary gravitons in (3+1) dimensions

Asante

Dittrich

Haggard

2019

J. High Energ. Phys.

Self Cite

View full text Add to dashboard Cite

Gravity is uniquely situated in between classical topological field theories and standard local field theories. This can be seen in the the quasi-local nature of gravitational observables, but is nowhere more apparent than in gravity's holographic formulation. Holography holds promise for simplifying computations in quantum gravity. While holographic descriptions of three-dimensional spacetimes and of spacetimes with a negative cosmological constant are well-developed, a complete boundary description of zero curvature, four-dimensional spacetime is not currently available. Building on previous work in three-dimensions, we provide a new route to four-dimensional holography and its boundary gravitons. Using Regge calculus linearized around a flat Euclidean background with the topology of a solid hyper-torus, we obtain the effective action for a dual boundary theory which describes the dynamics of the boundary gravitons. Remarkably, in the continuum limit and at large radii this boundary theory is local and closely analogous to the corresponding result in threedimensions. The boundary effective action has a degenerate kinetic term that leads to singularities in the one-loop partition function that are independent of the discretization. These results establish a rich boundary dynamics for four-dimensional flat holography. * Electronic address: sasanteATperimeterinstitute.ca † Electronic address: bdittrichATperimeterinstitute.ca ‡ Electronic address: haggardATbard.edu

show abstract

“…The states are peaked on homogeneous geometries. These geometries are however generalized in the same way as the standard loop quantum gravity geometries are, if understood in terms of piecewise flat simplicial building blocks [76][77][78][79][80].…”

Section: Discussionmentioning

confidence: 99%

Cosmological Constant from Condensation of Defect Excitations

Dittrich

2018

Universe

Self Cite

View full text Add to dashboard Cite

A key challenge for many quantum gravity approaches is to construct states that describe smooth geometries on large scales. Here we define a family of (2 + 1)-dimensional quantum gravity states which arise from curvature excitations concentrated at point like defects and describe homogeneously curved geometries on large scales. These states represent therefore vacua for three-dimensional gravity with different values of the cosmological constant. They can be described by an anomaly-free first class constraint algebra quantized on one and the same Hilbert space for different values of the cosmological constant. A similar construction is possible in four dimensions, in this case the curvature is concentrated along string-like defects and the states are vacua of the Crane-Yetter model. We will sketch applications for quantum cosmology and condensed matter.

show abstract

The degrees of freedom of area Regge calculus: dynamics, non-metricity, and broken diffeomorphisms

Cited by 25 publications

References 185 publications

Renormalization of symmetry restricted spin foam models with curvature in the asymptotic regime

Renormalization of symmetry restricted spin foam models with curvature in the asymptotic regime

Holographic description of boundary gravitons in (3+1) dimensions

Cosmological Constant from Condensation of Defect Excitations

Contact Info

Product

Resources

About