Curvatures and discrete Gauss–Codazzi equation in (2 + 1)-dimensional loop quantum gravity

Ariwahjoedi, Seramika; Kosasih, Jusak Sali; Rovelli, Carlo; Zen, Freddy P.

doi:10.1142/s0219887815501121

Cited by 3 publications

(10 citation statements)

References 14 publications

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“…The ADM formalism is based by an older theorem of Gauss, widely known by mathematicians as the Gauss-Codazzi relation, which describe the relation between curvatures of a manifold with its embeddded submanifold, or, in the language of general relativity, between spacetime and its hypersurface foliation. Works on canonical formulation of Regge calculus had been started by [37][38][39][40][41], and specifically, on the hypersurface foliation and Gauss-Codazzi equation in discrete geometry by [42,43], with the recent works by [44,45]. Our work is an attempt to clarify some parts of these previous results.…”

Section: Introductionmentioning

confidence: 87%

“…The following derivation will be based on our previous work [45]; e 0 in general will be a linear combination of coordinate basis vector in T p M :…”

Section: B Gauss-codazzi Equation In Fibre Bundlementioning

confidence: 99%

“…The curvatures need to satisfy some geometrical relations, which are, the Bianchi identity and the Gauss-Codazzi relation. The discrete version of the first has been studied extensively, for instance [52][53][54], and the latter in [42,43,45], but the discrete geometrical interpretation of these relations remain unclear.…”

Section: Introductionmentioning

confidence: 99%

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(2+1) Regge Calculus: Discrete Curvatures, Bianchi Identity, and Gauss-Codazzi Equation

Ariwahjoedi,

Zen

2017

Preprint

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The first results presented in our article are the clear definitions of both intrinsic and extrinsic discrete curvatures in terms of holonomy and plane-angle representation, a clear relation with their deficit angles, and their clear geometrical interpretations in the first order discrete geometry. The second results are the discrete version of Bianchi identity and Gauss-Codazzi equation, together with their geometrical interpretations. It turns out that the discrete Bianchi identity and Gauss-Codazzi equation, at least in 3-dimension, could be derived from the dihedral angle formula of a tetrahedron, while the dihedral angle relation itself is the spherical law of cosine in disguise. Furthermore, the continuous infinitesimal curvature 2-form, the standard Bianchi identity, and Gauss-Codazzi equation could be recovered in the continuum limit.

show abstract

Section: Introductionmentioning

confidence: 87%

“…The following derivation will be based on our previous work [45]; e 0 in general will be a linear combination of coordinate basis vector in T p M :…”

Section: B Gauss-codazzi Equation In Fibre Bundlementioning

confidence: 99%

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(2+1) Regge Calculus: Discrete Curvatures, Bianchi Identity, and Gauss-Codazzi Equation

Ariwahjoedi,

Zen

2017

Preprint

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“…10. For a detailed explanation about these angles, see [46,49,50]. Therefore, it is clear that formula (27) is purely intrinsic to the 2D surface, it does not depend on the embedding in R 3 , we only use R 3 to help us to derive relation (27) in an easy way.…”

Section: E Higher Dimensional Casementioning

confidence: 99%

Statistical discrete geometry

Ariwahjoedi,

Astuti,

Kosasih

et al. 2016

Preprint

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Following our earlier work [1], we construct statistical discrete geometry by applying statistical mechanics to discrete (Regge) gravity. We propose a coarse-graining method for discrete geometry under the assumptions of atomism and background independence. To maintain these assumptions, we propose restrictions to the theory by introducing cut-offs, both in ultraviolet and infrared regime. Having a well-defined statistical picture of discrete Regge geometry, we take the infinite degrees of freedom (large n) limit. We argue that the correct limit consistent with the restrictions and the background independence concept is not the continuum limit of statistical mechanics, but the thermodynamical limit.

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“…Intrinsic curvatures as an emergent property. Given the definition of intrinsic curvature of discrete geometry, which is the deficit angle located on the hinge shared by several simplices [1,34,41], it is clear that curvature can only be defined in a system of coupled n-particles of space, in other words, we could think the intrinsic curvature as an emergent property of a many-body system, it is the measure of how strong is the 'interaction' among the 'particles' of space.…”

Section: Calculating the Degrees Of Freedommentioning

confidence: 99%

Degrees of freedom in discrete geometry

Ariwahjoedi,

Kosasih,

Rovelli

et al. 2016

Preprint

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Following recent developments in discrete gravity, we study geometrical variables (angles and forms) of simplices in the discrete geometry point of view. Some of our relatively new results include: new ways of writing a set of simplices using vectorial (differential form) and coordinate-free pictures, and a consistent procedure to couple particles of space, together with a method to calculate the degrees of freedom of the system of 'quanta' of space in the classical framework.

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Curvatures and discrete Gauss–Codazzi equation in (2 + 1)-dimensional loop quantum gravity

Cited by 3 publications

References 14 publications

(2+1) Regge Calculus: Discrete Curvatures, Bianchi Identity, and Gauss-Codazzi Equation

(2+1) Regge Calculus: Discrete Curvatures, Bianchi Identity, and Gauss-Codazzi Equation

Statistical discrete geometry

Degrees of freedom in discrete geometry

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