Approaches to Quantum Gravity

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From quantum reference frames to deformed special relativity 527 [18] T. Thiemann, Reduced phase space quantization and Dirac observables, Class. Quant. Grav. 23 (2006) 1163, gr-qc/0411031. [19] F. Girelli, E. R. Livine, Harmonic oscillator representation of Loop Quantum Gravity, Class. Quant. Grav. 22 (2005) 3295–3314, gr-qc/0501075. [20] C. Barcelo, S. Liberati, M. Visser, Analogue gravity, Living Rev. Rel. 8 (2005) 12, gr-qc/0505065. [21] D. Colosi, C. Rovelli, A simple background-independent Hamiltonian quantum model, Phys. Rev. D 68 (2003) 104008, gr-qc/0306059. [22] Stephen D. Bartlett, Terry Rudolph, Robert W. Spekkens, Optimal measurements for relative quantum information, Phys. Rev. A 70 (2004) 032321, quant-ph/0310009. [23] M. A. Nielsen, I. L. Chuang, Quantum Computation and Quantum Information (Cambridge, Cambridge University Press, 2000). [24] S. D. Bartlett, T. Rudolph, R. W. Spekkens, P. S. Turner, Degradation of a quantum reference frame, New J. Phys. 8 (2006) 58, quant-ph/0602069. [25] D. Poulin, J. Yard, Dynamics of a quantum reference frame, quant-ph/0612126. [26] A. Ashtekar, L. Bombelli, A. Corichi, Semiclassical states for constrained systems, Phys. Rev. D 72 (2005) 025008, gr-qc/0504052. [27] D. Mattingly, Modern tests of Lorentz invariance, Living Rev. Rel. 8 (2005) 5, gr-qc/0502097. [28] F. de Felice, C. J. Clarke, Relativity on Curved Manifolds, Cambridge Monographs on Mathematical Physics (Cambridge, Cambridge University Press, 1990). [29] J. Magueijo, L. Smolin, Lorentz invariance with an invariant energy scale, Phys. Rev. Lett. 88 (2002) 190403, hep-th/0112090. [30] D. Bao, S.S. Chern, Z. Shen, An Introduction to Riemann–Finsler Geometry, Graduate Texts in Mathematics. v.200 (Springer Verlag, 2000). [31] M. Reuter, Nonperturbative evolution equation for quantum gravity, Phys. Rev. D 57 (1998) 971, hep-th/9605030. [32] J. D. Bekenstein, Are particle rest masses variable? Theory and constraints from solar system experiments, Phys. Rev. D 15 (1977) 1458. [33] F. Girelli, E. R. Livine, Some comments on the universal constant in DSR, gr-qc/0612111. [34] F. Girelli, E. R. Livine, Physics of deformed special relativity, Braz. J. Phys. 35 (2005) 432–438, gr-qc/0412079. [35] L. Freidel, personal communication.
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APPROACHES TO QUANTUM GRAVITY Towar
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A Sandra
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viii Contents 11 String theory, hol
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Contributors J. Ambjørn The Niels
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xii List of contributors D. Oriti M
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Preface Quantum Gravity is a dream,
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Preface xvii are following in their
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Preface xix enormous amount of prog
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1 Unfinished revolution C. ROVELLI
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Unfinished revolution 5 wit of empi
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Unfinished revolution 7 In general
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Unfinished revolution 9 However, re
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Unfinished revolution 11 References
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2 The fundamental nature of space a
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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 intermedi
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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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7 Emergent relativity O. DREYER 7.1
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A (a) Emergent relativity 101 (b) (
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Emergent relativity 103 It is here
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Emergent relativity 105 spacetime c
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Emergent relativity 107 φ A B Fig.
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Emergent relativity 109 If, on the
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8 Asymptotic safety R. PERCACCI 8.1
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Asymptotic safety 113 field and the
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Asymptotic safety 115 For example,
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Asymptotic safety 117 If we choose
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Asymptotic safety 119 complex field
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Asymptotic safety 121 2 G ~ ~ 1.5 1
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Asymptotic safety 123 larger, and i
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Asymptotic safety 125 Dimensional a
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Asymptotic safety 127 References [1
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9 New directions in background inde
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New directions in background indepe
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Questions and answers 151 Quantum G
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Questions and answers 153 was that
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Questions and answers 155 causality
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Questions and answers 157 to hold),
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Questions and answers 159 of how gr
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Questions and answers 161 the actio
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Questions and answers 163 allow us
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Questions and answers 165 - A-F.Mar
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10 Gauge/gravity duality G. HOROWIT
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Gauge/gravity duality 171 strong an
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Gauge/gravity duality 173 decompose
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Gauge/gravity duality 175 Here l s
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Gauge/gravity duality 177 There is
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Gauge/gravity duality 179 these are
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Gauge/gravity duality 181 leading t
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Gauge/gravity duality 183 states to
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Gauge/gravity duality 185 [6] N. Be
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11 String theory, holography and Qu
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String theory, holography and Quant
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String field theory 211 no tools to
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String field theory 213 made an ins
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(d) Cyclicity: ∫ ⋆= (−1) G G
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String field theory 217 however, th
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String field theory 219 12.2.3 Outs
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String field theory 221 a review) g
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String field theory 223 similar com
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String field theory 225 this; the p
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String field theory 227 [11] T. G.
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Questions and answers • Q - D. Or
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Questions and answers 231 condition
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Part III Loop quantum gravity and s
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236 T. Thiemann (anti)commute. We s
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238 T. Thiemann Notice that in gene
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240 T. Thiemann spectrum of all the
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242 T. Thiemann order to avoid anom
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244 T. Thiemann We consider spaceti
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246 T. Thiemann Hence both gauge gr
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248 T. Thiemann that Ĉ(N) cannot b
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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. Livine SU(2) gauge theory. T
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256 E. Livine space; η IJ is the f
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258 E. Livine However, in contrast
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260 E. Livine (i) Either we work wi
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262 E. Livine At the end of the day
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264 E. Livine projector at the end
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266 E. Livine for a surface S inter
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268 E. Livine This constraint is sa
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270 E. Livine we do not need the se
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15 The spin foam representation of
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274 A. Perez in classical general r
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276 A. Perez where M = ×R (for an
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278 A. Perez the Levi-Civita tensor
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280 A. Perez k Tr[ k (W p )] ✄ j
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282 A. Perez j j j k j k m k m j j
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284 A. Perez Here we studied the in
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286 A. Perez A spin foam representa
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288 A. Perez master-constraint prog
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16 Three-dimensional spin foam Quan
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292 L. Freidel 16.3 The Ponzano-Reg
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294 L. Freidel under usual gauge tr
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296 L. Freidel is now constrained t
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298 L. Freidel 16.4.1 Mathematical
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300 L. Freidel Therefore, at first
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302 L. Freidel The inverse group Fo
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304 L. Freidel From this identity,
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306 L. Freidel choice of statistics
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308 L. Freidel A deeper study of th
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17 The group field theory approach
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312 D. Oriti simplicial complex, or
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314 D. Oriti are not all simultaneo
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316 D. Oriti diagrams correspond to
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318 D. Oriti is the simple fact tha
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320 D. Oriti better, by a single ma
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322 D. Oriti or SO(3, 1)) [8; 9; 10
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324 D. Oriti where: g i ∈ G, s i
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326 D. Oriti observables in GFTs ar
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328 D. Oriti research. On the other
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330 D. Oriti of the possibility of
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Questions and answers • Q - L. Cr
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334 Questions and answers I partly
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336 Questions and answers spectrum
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Part IV Discrete Quantum Gravity
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342 J. Ambjørn, J. Jurkiewicz and
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19 Quantum Regge calculus R. WILLIA
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362 R. Williams only in flat space
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364 R. Williams where V is the volu
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366 R. Williams equations of motion
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368 R. Williams Dropping the 1/d co
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370 R. Williams At a typical interi
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372 R. Williams about which it make
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374 R. Williams dealt with include
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376 R. Williams [27] H. W. Hamber,
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20 Consistent discretizations as a
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380 R. Gambini and J. Pullin The mo
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382 R. Gambini and J. Pullin phase
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384 R. Gambini and J. Pullin 2 1 q
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386 R. Gambini and J. Pullin of the
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388 R. Gambini and J. Pullin accept
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390 R. Gambini and J. Pullin isomor
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392 R. Gambini and J. Pullin [3] C.
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394 J. Henson all the other subject
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396 J. Henson z y x Fig. 21.1. A ca
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398 J. Henson this way, no discrete
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400 J. Henson out various sprinklin
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402 J. Henson commutes with rotatio
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404 J. Henson black hole entropy (o
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406 J. Henson “Kleitman-Rothschil
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408 J. Henson histories suggest any
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410 J. Henson the type normally use
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412 J. Henson [17] R. D. Sorkin (19
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Questions and answers • Q - J. He
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416 Questions and answers that the
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418 Questions and answers 2. The ab
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420 Questions and answers not unimp
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422 Questions and answers - A - R.
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Part V Effective models and Quantum
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428 G. Amelino-Camelia For this phe
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430 G. Amelino-Camelia correction t
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432 G. Amelino-Camelia to the fact
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434 G. Amelino-Camelia 22.2.2 Planc
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436 G. Amelino-Camelia formalism in
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438 G. Amelino-Camelia 22.3 On the
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440 G. Amelino-Camelia 22.4 Aside o
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442 G. Amelino-Camelia A theory wil
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444 G. Amelino-Camelia we might be
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446 G. Amelino-Camelia For the disp
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448 G. Amelino-Camelia References [
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23 Quantum Gravity and precision te
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452 C. Burgess with the following s
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454 C. Burgess For this reason it i
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456 C. Burgess ) E ( m ) P ( ( 1 2L
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458 C. Burgess the low-energy exper
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460 C. Burgess couplings contribute
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462 C. Burgess Non-relativistic sou
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464 C. Burgess contribute at any gi
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24 Algebraic approach to Quantum Gr
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468 S. Majid has been called a ‘P
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470 S. Majid α → u −1 αu + u
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472 S. Majid coordinates the coprod
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474 S. Majid Position Momentum Grav
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476 S. Majid quantum group acts cov
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478 S. Majid where we introduce p 0
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480 S. Majid λ p 0 2 θ < 0 1.5 1
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482 S. Majid to complete the struct
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484 S. Majid C[SO 3,1 ]◮⊳U(R 3
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486 S. Majid 24.5 Physical interpre
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488 S. Majid image. This brings wit
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490 S. Majid direction, even though
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492 S. Majid [4] S. Majid and L. Fr
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494 J. Kowalski-Glikman Now DSR pos
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496 J. Kowalski-Glikman as it is be
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498 J. Kowalski-Glikman former redu
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500 J. Kowalski-Glikman algebra bec
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Page 1054: 506 J. Kowalski-Glikman (Quantum) G
Page 1058: 508 J. Kowalski-Glikman [8] L. Frei
Page 1062: 510 F. Girelli The new Lagrangian
Page 1066: 512 F. Girelli The discussion can b
Page 1070: 514 F. Girelli The first key questi
Page 1074: 516 F. Girelli By doing a sequence
Page 1078: 518 F. Girelli M P as a maximum mas
Page 1082: 520 F. Girelli the Legendre transfo
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Page 1090: 524 F. Girelli We can define differ
Page 1094: 526 F. Girelli groups, but also pus
Page 1100: Lorentz invariance violation & its
Page 1140: Generic predictions of quantum theo
Page 1144: Generic predictions of quantum theo
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Generic predictions of quantum theo
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Questions and answers • Q - L. Cr
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Questions and answers 573 frame. Ju
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Questions and answers 575 - A - J.
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Questions and answers 577 where thi
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Questions and answers 579 would all
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Index 581 cosmology, 26, 155, 184,
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Index 583 emergent, 99, 109, 163, 1
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