Quantum Gravity

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340 REFERENCESHawking, S. W. (1976). Breakdown of predictability in gravitational collapse.Phys. Rev. D, 14, 2460–73.Hawking, S. W. (1979). The path-integral approach to quantum gravity. InGeneral relativity. An Einstein centenary survey (ed. S. W. Hawking and W.Israel), pp. 746–89. Cambridge University Press, Cambridge.Hawking, S. W. (1982). The boundary conditions of the universe. PontificiaAcademiae Scientarium Scripta Varia, 48, 563–74.Hawking, S. W. (1984). The quantum state of the universe. Nucl. Phys. B, 239,257–76.Hawking, S. W. (2005). Information loss in black holes. Phys. Rev. D, 72,084013 [4 pages].Hawking, S. W. and Ellis, G. F. R. (1973). The large scale structure of space–time. Cambridge University Press, Cambridge.Hawking, S. W. and Penrose, R. (1996). The nature of space and time. PrincetonUniversity Press, Princeton.Hayward, G. (1993). Gravitational action for spacetimes with nonsmooth boundaries.Phys. Rev. D, 47, 3275–80.Hehl, F. W. (1985). On the kinematics of the torsion of space–time. Found.Phys., 15, 451–71.Hehl, F. W., Kiefer, C., and Metzler, R. J. K. (ed.) (1998). Black holes: theoryand observation. Lecture Notes in Physics 514. Springer, Berlin.Hehl, F. W., Lemke, J., and Mielke, E.W. (1991). Two lectures on fermionsand gravity. In Geometry and theoretical physics (ed. J. Debrus and A. C.Hirshfeld), pp. 56–140. Springer, Berlin.Hehl, F. W., von der Heyde, P., Kerlick, G. D., and Nester, J. M. (1976). Generalrelativity with spin and torsion. Rev. Mod. Phys., 48, 393–416.Heisenberg, W. (1979). Der Teil und das Ganze. Deutscher Taschenbuch Verlag,Munich.Heitler, W. (1984). The quantum theory of radiation. Dover Publications, NewYork.Helfer, A. D. (1996). The stress-energy operator. Class. <strong>Quantum</strong> Grav., 13,L129–34.Henneaux, M. and Teitelboim, C. (1992). Quantization of gauge systems. PrincetonUniversity Press, Princeton.Heusler, M. (1996). Black hole uniqueness theorems. Cambridge UniversityPress, Cambridge.Heusler, M., Kiefer, C., and Straumann, N. (1990). Self-energy of a thin chargedshell in general relativity. Phys. Rev. D, 42, 4254–6.Higgs, P. W. (1958). Integration of secondary constraints in quantized generalrelativity. Phys. Rev. Lett., 1, 373–4.Hod, S. (1998). Bohr’s correspondence principle and the area spectrum of quantumblack holes. Phys. Rev. Lett., 81, 4293–6.Hogan, C. J. (2000). Why the universe is just so. Rev. Mod. Phys., 72, 1149–61.
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INTERNATIONAL SERIESOFMONOGRAPHS ON
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Quantum GravitySecond EditionCLAUS
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PREFACE TO THE SECOND EDITIONThe co
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PREFACEThe unification of quantum t
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CONTENTS1 Why quantum gravity? 11.1
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CONTENTSxi7.4.3 Quantization 2267.5
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1WHY QUANTUM GRAVITY?1.1 Quantum th
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QUANTUM THEORY AND THE GRAVITATIONA
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PROBLEMS OF A FUNDAMENTALLY SEMICLA
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APPROACHES TO QUANTUM GRAVITY 23is
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2COVARIANT APPROACHES TO QUANTUM GR
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THE CONCEPT OF A GRAVITON 27two ind
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THE CONCEPT OF A GRAVITON 29Exploit
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THE CONCEPT OF A GRAVITON 31of the
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THE CONCEPT OF A GRAVITON 33only th
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THE CONCEPT OF A GRAVITON 35¬Þ Ð
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THE CONCEPT OF A GRAVITON 37where P
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PATH-INTEGRAL QUANTIZATION 39state
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PATH-INTEGRAL QUANTIZATION 41canoni
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PATH-INTEGRAL QUANTIZATION 43intera
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PATH-INTEGRAL QUANTIZATION 45quantu
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PATH-INTEGRAL QUANTIZATION 47R 3 an
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PATH-INTEGRAL QUANTIZATION 49Perfor
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PATH-INTEGRAL QUANTIZATION 51 ££
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PATH-INTEGRAL QUANTIZATION 53Ven (1
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PATH-INTEGRAL QUANTIZATION 55formal
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PATH-INTEGRAL QUANTIZATION 57Unfort
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PATH-INTEGRAL QUANTIZATION 59F =
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PATH-INTEGRAL QUANTIZATION 61and c
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PATH-INTEGRAL QUANTIZATION 63first
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PATH-INTEGRAL QUANTIZATION 65is obt
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PATH-INTEGRAL QUANTIZATION 67t+1t(4
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PATH-INTEGRAL QUANTIZATION 69For th
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QUANTUM SUPERGRAVITY 71quantum fiel
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3PARAMETRIZED AND RELATIONAL SYSTEM
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PARTICLE SYSTEMS 75can be set to ze
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and are compatible with the time ev
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where herePARTICLE SYSTEMS 79H S
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THE FREE BOSONIC STRING 81render th
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THE FREE BOSONIC STRING 83andĤ 1
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THE FREE BOSONIC STRING 85In the st
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PARAMETRIZED FIELD THEORIES 87with
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PARAMETRIZED FIELD THEORIES 89Ü Ü
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PARAMETRIZED FIELD THEORIES 91space
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RELATIONAL DYNAMICAL SYSTEMS 93X x
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RELATIONAL DYNAMICAL SYSTEMS 95wher
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RELATIONAL DYNAMICAL SYSTEMS 97This
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THE SEVENTH ROUTE TO GEOMETRODYNAMI
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THE 3+1 DECOMPOSITION OF GENERAL RE
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120 HAMILTONIAN FORMULATION OF GENE
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134 QUANTUM GEOMETRODYNAMICSand its
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136 QUANTUM GEOMETRODYNAMICSBell (1
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138 QUANTUM GEOMETRODYNAMICSThe fir
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140 QUANTUM GEOMETRODYNAMICS5. ‘S
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142 QUANTUM GEOMETRODYNAMICSwhere h
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144 QUANTUM GEOMETRODYNAMICSperienc
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146 QUANTUM GEOMETRODYNAMICS∞∑k
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148 QUANTUM GEOMETRODYNAMICSThe ‘
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150 QUANTUM GEOMETRODYNAMICSIn anal
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152 QUANTUM GEOMETRODYNAMICS∫δZ
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154 QUANTUM GEOMETRODYNAMICSfields.
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156 QUANTUM GEOMETRODYNAMICSand π
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158 QUANTUM GEOMETRODYNAMICSwhere D
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160 QUANTUM GEOMETRODYNAMICSn AA′
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162 QUANTUM GEOMETRODYNAMICSThe tim
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164 QUANTUM GEOMETRODYNAMICSH AA
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166 QUANTUM GEOMETRODYNAMICSnatural
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168 QUANTUM GEOMETRODYNAMICSOne can
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170 QUANTUM GEOMETRODYNAMICSan expa
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172 QUANTUM GEOMETRODYNAMICS∫∂
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174 QUANTUM GEOMETRODYNAMICS] [Ĥg
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176 QUANTUM GEOMETRODYNAMICSSection
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178 QUANTUM GEOMETRODYNAMICStechnic
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180 QUANTUM GEOMETRODYNAMICSÑ ¾
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182 QUANTUM GRAVITY WITH CONNECTION
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200 QUANTIZATION OF BLACK HOLESto a
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202 QUANTIZATION OF BLACK HOLESTabl
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204 QUANTIZATION OF BLACK HOLESrepl
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206 QUANTIZATION OF BLACK HOLESThe
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208 QUANTIZATION OF BLACK HOLEScan
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210 QUANTIZATION OF BLACK HOLESAsht
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212 QUANTIZATION OF BLACK HOLESAs l
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214 QUANTIZATION OF BLACK HOLESIntr
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216 QUANTIZATION OF BLACK HOLESwhic
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218 QUANTIZATION OF BLACK HOLESclud
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220 QUANTIZATION OF BLACK HOLESTaki
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222 QUANTIZATION OF BLACK HOLESradi
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224 QUANTIZATION OF BLACK HOLESÂ
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226 QUANTIZATION OF BLACK HOLESseco
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228 QUANTIZATION OF BLACK HOLESψ
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230 QUANTIZATION OF BLACK HOLESTher
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232 QUANTIZATION OF BLACK HOLESWe m
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234 QUANTIZATION OF BLACK HOLESandB
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236 QUANTIZATION OF BLACK HOLESE =
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238 QUANTIZATION OF BLACK HOLESThis
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240 QUANTIZATION OF BLACK HOLESlog
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242 QUANTIZATION OF BLACK HOLESlg
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244 QUANTUM COSMOLOGYconcerns in pa
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246 QUANTUM COSMOLOGY8.1.2 Quantiza
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248 QUANTUM COSMOLOGYso one might a
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250 QUANTUM COSMOLOGYOne recognizes
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252 QUANTUM COSMOLOGYWhereas in the
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254 QUANTUM COSMOLOGYFig. 8.2. Wave
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256 QUANTUM COSMOLOGY)(− ∂2 ∂
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258 QUANTUM COSMOLOGYThe second-ord
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260 QUANTUM COSMOLOGYwaves and are
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262 QUANTUM COSMOLOGYOne could also
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264 QUANTUM COSMOLOGYExcept in simp
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266 QUANTUM COSMOLOGYTimetImaginary
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268 QUANTUM COSMOLOGYfrom the no-bo
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270 QUANTUM COSMOLOGYbetween ψ T a
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272 QUANTUM COSMOLOGY8.3.5 Symmetri
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274 QUANTUM COSMOLOGYwhere in the c
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276 QUANTUM COSMOLOGYholonomies int
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278 QUANTUM COSMOLOGYfor recollapsi
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280 STRING THEORY4. All ‘particle
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282 STRING THEORYH = 1 2∞∑n=−
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284 STRING THEORYD − 2 = 24 degre
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286 STRING THEORYThe full action is
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288 STRING THEORYdivergences of qua
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290 STRING THEORYWe have already em
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292 STRING THEORY√X µ R (σ− )
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294 STRING THEORY(and beyond) for c
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296 STRING THEORYdetails.We start b
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298 STRING THEORYThere exist two di
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300 STRING THEORYhole can form if g
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302 STRING THEORYthe metric is flat
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304 STRING THEORYaccount. We shall
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306 STRING THEORYholographic princi
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308 INTERPRETATION10.1.1 Decoherenc
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310 INTERPRETATIONthe quantum entan
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312 INTERPRETATIONThe time t that a
Page 652: 314 INTERPRETATIOND(t|φ, φ ′ )=
Page 656: 316 INTERPRETATIONFor a massive min
Page 660: 318 INTERPRETATIONwhich are dynamic
Page 664: 320 INTERPRETATIONAlthough most of
Page 668: 322 INTERPRETATIONthe existence of
Page 672: 324 INTERPRETATIONclassical turning
Page 676: 326 INTERPRETATIONquantum-gravitati
Page 680: 328 REFERENCESAshtekar, A. and Lewa
Page 684: 330 REFERENCESBarvinsky, A. O., Kam
Page 688: 332 REFERENCESBojowald, M. (2001b).
Page 692: 334 REFERENCESCsordás, A. and Grah
Page 696: 336 REFERENCESpp. 458-73. Birkhäus
Page 700: 338 REFERENCESGiulini, D. (2003). T
Page 706: REFERENCES 341Hogan, C. J. (2002).
Page 710: REFERENCES 343Kiefer, C. (2001a). P
Page 714: REFERENCES 345Lämmerzahl, C. (1998
Page 718: REFERENCES 347Misner, C. W. (1957).
Page 722: REFERENCES 349Penrose, R. (1996). O
Page 726: REFERENCES 351Singh, T. P. (2005).
Page 730: REFERENCES 353Uzan, J.-P. (2003). T
Page 734: REFERENCES 355Zeh, H. D. (1986). Em
Page 738: INDEXabsolute elements, 73accelerat
Page 742: INDEX 359Hawking temperature, 14, 2
Page 746: INDEX 361in minisuperspace, 249Wick
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Quantum Gravity

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