Approaches to Quantum Gravity

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Generic predictions of quantum theories of gravity 569[27] M. Bojowald, The semiclassical limit of loop quantum cosmology,Class.Quant.Grav. 18 (2001) L109–L116, gr-qc/0105113.[28] M. Bojowald, Dynamical initial conditions in quantum cosmology, Phys. Rev. Lett.87 (2001) 121301, gr-qc/0104072.[29] M. Bojowald, Absence of singularity in loop quantum cosmology, Phys. Rev. Lett.86 (2001) 5227, gr-qc/0102069.[30] M. Bojowald, Elements of loop quantum cosmology, Chapter contributed to 100Years of Relativity – Space-time Structure: Einstein and Beyond, ed. A. Ashtekar,gr-qc/0505057.[31] V. Husain, O. Winkler, Quantum resolution of black hole singularities, Class. Quant.Grav. 22 (2005) L127–L134, gr-qc/0410125.[32] L. Modesto, Disappearance of black hole singularity in quantum gravity, Phys. Rev.D70 (2004) 124009, gr-qc/0407097.[33] L. Smolin, Linking topological quantum field theory and nonperturbative quantumgravity, J. Math. Phys. 36 (1995) 6417, gr-qc/9505028, CGPG-95/4-5,IASSNS-95/29.[34] K. Krasnov, On quantum statistical mechanics of a Schwarzschild black hole, Gen.Rel. Grav. 30 (1998) 53–68, gr-qc/9605047.[35] C. Rovelli, Black hole entropy from loop quantum gravity, gr-qc/9603063.[36] A. Ashtekar, J. Baez, K. Krasnov, Quantum geometry of isolated horizons and blackhole entropy gr-qc/0005126.[37] A. Ashtekar, J. Baez, A. Corichi, K. Krasnov, Quantum geometry and black holeentropy, Phys. Rev. Lett. 80 (1998) 904–907, gr-qc/9710007.[38] A. Ashtekar, B. Krishnan, Isolated and dynamical horizons and their applications,Living Rev. Rel. 7 (2004) 10, gr-qc/0407042.[39] O. Dreyer, Quasinormal modes, the area spectrum, and black hole entropy,Phys.Rev.Lett. 90 (2003) 081301, gr-qc/0211076.[40] O. Dreyer, F. Markopoulou, L. Smolin, Symmetry and entropy of black holehorizons, hep-th/0409056.[41] M. Ansari, Entanglement entropy in loop quantum gravity, gr-qc/0603115.[42] S. Das, Parthasarathi Majumdar, Rajat K. Bhaduri, General logarithmic correctionsto black hole entropy, Class. Quant. Grav. 19 (2002) 2355–2368.[43] S. Das, Leading log corrections to Bekenstein–Hawking entropy, hep-th/0207072.[44] M. Ansari, in preparation.[45] S. Major, L. Smolin, Quantum deformation of quantum gravity, Nucl. Phys. B473(1996) 267, gr-qc/9512020.[46] R. Borissov, S. Major, L. Smolin, The geometry of quantum spin networks, Class.and Quant. Grav. 12 (1996) 3183, gr-qc/9512043.[47] L. Smolin, Quantum gravity with a positive cosmological constant,hep-th/0209079.[48] T.Banks, Cosmological breaking of supersymmetry?, hep-th/0007146.[49] L. H. Kauffma, Knots and Physics (Singapore, World Scientific, 1991).[50] S. Majid, Foundations of Quantum Group Theory (Cambridge University Press,1995).[51] L. Smolin, C. Soo, The Chern–Simons invariant as the natural time variable forclassical and quantum gravity, Nucl. Phys. B 327 (1995) 205, gr-qc/9405015.[52] A. Ashtekar, C. Rovelli, L. Smolin, Weaving a classical metric with quantumthreads, Phys. Rev. Lett. 69 (1992) 237– 240.[53] C. Rovelli, Graviton propagator from background-independent quantum gravity,gr-qc/0508124.
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APPROACHES TO QUANTUM GRAVITYToward
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A Sandra
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viiiContents11 String theory, holog
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ContributorsJ. AmbjørnThe Niels Bo
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xiiList of contributorsD. OritiMax
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PrefaceQuantum Gravity is a dream,
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Prefacexviiare following in their s
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Prefacexixenormous amount of progre
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1Unfinished revolutionC. ROVELLIOne
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Unfinished revolution 5wit of empir
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Unfinished revolution 7In general r
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Unfinished revolution 9However, res
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Unfinished revolution 11References[
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2The fundamental nature of space an
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The fundamental nature of space and
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Does locality fail at intermediate
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∫Does locality fail at intermedia
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Prolegomena to any future Quantum G
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Spacetime symmetries in histories c
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Categorical geometry and the mathem
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7Emergent relativityO. DREYER7.1 In
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A(a)Emergent relativity 101(b)(c)B(
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Emergent relativity 103It is here t
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Emergent relativity 105spacetime co
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Emergent relativity 107φABFig. 7.4
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Emergent relativity 109If, on the o
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8Asymptotic safetyR. PERCACCI8.1 In
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Asymptotic safety 113field and the
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Asymptotic safety 115For example, t
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Asymptotic safety 117If we choose k
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Asymptotic safety 119complex fields
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Asymptotic safety 1212G ~ ~1.510.5-
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Asymptotic safety 123larger, and it
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Asymptotic safety 125Dimensional an
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Asymptotic safety 127References[1]
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9New directions in background indep
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New directions in background indepe
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Questions and answers 151Quantum Gr
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Questions and answers 153was that t
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Questions and answers 155causality
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Questions and answers 157to hold),
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Questions and answers 159of how gra
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Questions and answers 161the action
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Questions and answers 163allow us t
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Questions and answers 165- A-F.Mark
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10Gauge/gravity dualityG. HOROWITZ
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Gauge/gravity duality 171strong and
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Gauge/gravity duality 173decomposed
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Gauge/gravity duality 175Here l s i
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Gauge/gravity duality 177There is a
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Gauge/gravity duality 179these are
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Gauge/gravity duality 181leading to
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Gauge/gravity duality 183states to
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Gauge/gravity duality 185[6] N. Ber
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11String theory, holography and Qua
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String theory, holography and Quant
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String field theory 211no tools to
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String field theory 213made an insi
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(d) Cyclicity: ∫ ⋆= (−1) G G
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String field theory 217however, the
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String field theory 21912.2.3 Outst
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String field theory 221a review) gi
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String field theory 223similar comp
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String field theory 225this; the ph
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String field theory 227[11] T. G. E
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Questions and answers• Q - D. Ori
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Questions and answers 231condition
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Part IIILoop quantum gravity and sp
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236 T. Thiemann(anti)commute. We se
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238 T. ThiemannNotice that in gener
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240 T. Thiemannspectrum of all the
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242 T. Thiemannorder to avoid anoma
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244 T. ThiemannWe consider spacetim
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246 T. ThiemannHence both gauge gro
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248 T. Thiemannthat Ĉ(N) cannot be
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250 T. Thiemann[8] R. Brunetti, K.
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252 T. Thiemann[48] M. Bojowald, H.
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254 E. LivineSU(2) gauge theory. Th
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256 E. Livinespace; η IJ is the fl
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258 E. LivineHowever, in contrast t
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260 E. Livine(i) Either we work wit
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262 E. LivineAt the end of the day,
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264 E. Livineprojector at the end v
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266 E. Livinefor a surface S inters
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268 E. LivineThis constraint is sat
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270 E. Livinewe do not need the sec
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15The spin foam representation of l
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274 A. Perezin classical general re
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276 A. Perezwhere M = ×R (for an
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278 A. Perezthe Levi-Civita tensor.
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280 A. PerezkTr[ k (W p )] ✄jP=
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282 A. Perezjjjkjkmkmjjjjmkmkmkmkkj
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284 A. PerezHere we studied the int
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286 A. PerezA spin foam representat
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288 A. Perezmaster-constraint progr
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16Three-dimensional spin foam Quant
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292 L. Freidel16.3 The Ponzano-Regg
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294 L. Freidelunder usual gauge tra
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296 L. Freidelis now constrained to
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298 L. Freidel16.4.1 Mathematical s
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300 L. FreidelTherefore, at first o
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302 L. FreidelThe inverse group Fou
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304 L. FreidelFrom this identity, i
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306 L. Freidelchoice of statistics.
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308 L. FreidelA deeper study of the
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17The group field theory approach t
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312 D. Oritisimplicial complex, or
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314 D. Oritiare not all simultaneou
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316 D. Oritidiagrams correspond to
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318 D. Oritiis the simple fact that
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320 D. Oritibetter, by a single mat
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322 D. Oritior SO(3, 1)) [8; 9; 10]
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324 D. Oritiwhere: g i ∈ G, s i
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326 D. Oritiobservables in GFTs are
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328 D. Oritiresearch. On the other
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330 D. Oritiof the possibility of a
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Questions and answers• Q - L. Cra
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334 Questions and answersI partly d
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336 Questions and answersspectrum i
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Part IVDiscrete Quantum Gravity
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342 J. Ambjørn, J. Jurkiewicz and
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19Quantum Regge calculusR. WILLIAMS
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362 R. Williamsonly in flat space a
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364 R. Williamswhere V is the volum
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366 R. Williamsequations of motion.
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368 R. WilliamsDropping the 1/d cor
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370 R. WilliamsAt a typical interio
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372 R. Williamsabout which it makes
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374 R. Williamsdealt with include t
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376 R. Williams[27] H. W. Hamber, P
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20Consistent discretizations as a r
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380 R. Gambini and J. PullinThe mod
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382 R. Gambini and J. Pullinphase s
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384 R. Gambini and J. Pullin21q 20-
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386 R. Gambini and J. Pullinof the
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388 R. Gambini and J. Pullinaccepts
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390 R. Gambini and J. Pullinisomorp
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392 R. Gambini and J. Pullin[3] C.
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394 J. Hensonall the other subjects
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396 J. HensonzyxFig. 21.1. A causal
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398 J. Hensonthis way, no discreten
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400 J. Hensonout various sprinkling
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402 J. Hensoncommutes with rotation
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404 J. Hensonblack hole entropy (or
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406 J. Henson“Kleitman-Rothschild
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408 J. Hensonhistories suggest any
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410 J. Hensonthe type normally used
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412 J. Henson[17] R. D. Sorkin (199
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Questions and answers• Q - J. Hen
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416 Questions and answersthat the l
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418 Questions and answers2. The abo
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420 Questions and answersnot unimpo
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422 Questions and answers- A - R. G
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Part VEffective models and Quantum
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428 G. Amelino-CameliaFor this phen
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430 G. Amelino-Cameliacorrection to
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432 G. Amelino-Cameliato the fact t
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434 G. Amelino-Camelia22.2.2 Planck
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436 G. Amelino-Cameliaformalism in
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438 G. Amelino-Camelia22.3 On the s
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440 G. Amelino-Camelia22.4 Aside on
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442 G. Amelino-CameliaA theory will
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444 G. Amelino-Cameliawe might be c
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446 G. Amelino-CameliaFor the dispe
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448 G. Amelino-CameliaReferences[1]
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23Quantum Gravity and precision tes
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452 C. Burgesswith the following sc
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454 C. BurgessFor this reason it is
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456 C. Burgess) E ( m) P( ( 1 2L EA
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458 C. Burgessthe low-energy experi
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460 C. Burgesscouplings contribute.
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462 C. BurgessNon-relativistic sour
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464 C. Burgesscontribute at any giv
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24Algebraic approach to Quantum Gra
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468 S. Majidhas been called a ‘Pl
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470 S. Majidα → u −1 αu + u
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472 S. Majidcoordinates the coprodu
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474 S. MajidPositionMomentumGravity
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476 S. Majidquantum group acts cova
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478 S. Majidwhere we introduce p 0
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480 S. Majidλ p 0 2θ < 01.51A0.50
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482 S. Majidto complete the structu
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484 S. MajidC[SO 3,1 ]◮⊳U(R 3 >
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486 S. Majid24.5 Physical interpret
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488 S. Majidimage. This brings with
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490 S. Majiddirection, even though
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492 S. Majid[4] S. Majid and L. Fre
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494 J. Kowalski-GlikmanNow DSR post
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496 J. Kowalski-Glikmanas it is bel
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498 J. Kowalski-Glikmanformer reduc
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500 J. Kowalski-Glikmanalgebra beco
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502 J. Kowalski-GlikmanRelativistic
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504 J. Kowalski-GlikmanLeibniz rule
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506 J. Kowalski-Glikman(Quantum) Gr
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508 J. Kowalski-Glikman[8] L. Freid
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510 F. GirelliThe new Lagrangian ˜
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512 F. GirelliThe discussion can be
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514 F. GirelliThe first key questio
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516 F. GirelliBy doing a sequence o
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518 F. GirelliM P as a maximum mass
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520 F. Girellithe Legendre transfor
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522 F. Girelliwhere λ i are Lagran
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524 F. GirelliWe can define differe
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526 F. Girelligroups, but also push
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27Lorentz invariance violation and
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530 J. Collins, A. Perez and D. Sud
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Page 1130: 544 J. Collins, A. Perez and D. Sud
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Page 1138: 28Generic predictions of quantum th
Page 1142: 550 L. Smolin28.2 Assumptions of ba
Page 1146: 552 L. SmolinGeneral Relativity is
Page 1150: 554 L. SmolinStarting with the acti
Page 1154: 556 L. Smolintheory should dominate
Page 1158: 558 L. Smolinthe Ashtekar formulati
Page 1162: 560 L. Smolinare identified by thei
Page 1166: 562 L. Smolinmoves: no matter how m
Page 1170: 564 L. Smolinnodes so that no large
Page 1174: 566 L. Smolinwhere T is the tempera
Page 1178: 568 L. SmolinJ. Magueijo, S. Majid,
Page 1184: Questions and answers• Q - L. Cra
Page 1188: Questions and answers 573frame. Jus
Page 1192: Questions and answers 575- A - J. K
Page 1196: Questions and answers 577where this
Page 1200: Questions and answers 579would allo
Page 1204: Index 581cosmology, 26, 155, 184, 1
Page 1208: Index 583emergent, 99, 109, 163, 17
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