Loop Quantum Gravity

AbstractThe problem of finding the quantum theory of the gravitational field, and thus understanding what is quantum spacetime, is still open. One of the most active of the current approaches is loop quantum gravity. Loop quantum gravity is a mathematically well-defined, non-perturbative and background independent quantization of general relativity, with its conventional matter couplings. Research in loop quantum gravity today forms a vast area, ranging from mathematical foundations to physical applications. Among the most significant results obtained are: (i)The computation of the physical spectra of geometrical quantities such as area and volume, which yields quantitative predictions on Planck-scale physics.(ii)A derivation of the Bekenstein-Hawking black hole entropy formula.(iii)An intriguing physical picture of the microstructure of quantum physical space, characterized by a polymer-like Planck scale discreteness. This discreteness emerges naturally from the quantum theory and provides a mathematically well-defined realization of Wheeler’s intuition of a spacetime “foam”. Long standing open problems within the approach (lack of a scalar product, over-completeness of the loop basis, implementation of reality conditions) have been fully solved. The weak part of the approach is the treatment of the dynamics: at present there exist several proposals, which are intensely debated. Here, I provide a general overview of ideas, techniques, results and open problems of this candidate theory of quantum gravity, and a guide to the relevant literature.

[1]  H. Fort,et al.  Lattice knot theory and quantum gravity in the loop representation , 1996, gr-qc/9608033.

[2]  S. Hawking,et al.  Black hole explosions? , 1974, Nature.

[3]  J. Ambjorn,et al.  The geometry of dynamical triangulations , 1996, hep-th/9612069.

[4]  C. Rovelli,et al.  GRAVITONS AS EMBROIDERY ON THE WEAVE , 1992 .

[5]  Barbero G Jf Real-polynomial formulation of general relativity in terms of connections. , 1994 .

[7]  C. Isham Structural issues in quantum gravity , 1995, gr-qc/9510063.

[8]  Spin networks, Turaev-Viro theory and the loop representation , 1994, gr-qc/9408013.

[9]  H. Friedrich,et al.  Canonical Gravity: From Classical to Quantum , 1994 .

[10]  A. Connes,et al.  Von Neumann algebra automorphisms and time-thermodynamics relation in general covariant quantum theories , 1994, gr-qc/9406019.

[11]  Krasnov Quantum loop representation for fermions coupled to an Einstein-Maxwell field. , 1996, Physical review. D, Particles and fields.

[12]  A. Ashtekar,et al.  Institute for Mathematical Physics Projective Techniques and Functional Integration for Gauge Theories Projective Techniques and Functional Integration for Gauge Theories , 2022 .

[13]  Causal evolution of spin networks , 1997, gr-qc/9702025.

[14]  J. Baez Strings, Loops, Knots and Gauge Fields , 1993, hep-th/9309067.

[15]  L. Crane Topological Field Theory As The Key To Quantum Gravity , 1993, hep-th/9308126.

[16]  A. Ashtekar,et al.  New Hamiltonian formulation of general relativity. , 1987, Physical review. D, Particles and fields.

[17]  C. Vafa,et al.  Microscopic origin of the Bekenstein-Hawking entropy , 1996, hep-th/9601029.

[18]  W. B. Raymond Lickorish,et al.  Temperley-Lieb Recoupling Theory and Invariants of 3-Manifolds , 1994 .

[19]  Quantum geometry of isolated horizons and black hole entropy , 2000, gr-qc/0005126.

[20]  L. Smolin,et al.  The Bekenstein bound, topological quantum field theory and pluralistic quantum cosmology , 1995, gr-qc/9508064.

[21]  A Lorentzian signature model for quantum general relativity , 1999, gr-qc/9904025.

[22]  Closed formula for Wilson loops for $SU(N)$ Quantum Yang-Mills Theory in two dimensions , 1996, hep-th/9605128.

[23]  Generalized measures in gauge theory , 1993, hep-th/9310201.

[24]  Graphical evolution of spin network states , 1996, gr-qc/9606013.

[25]  E. Harrison Quantum Cosmology , 2022, Nature.

[26]  A. Sen Gravity as a spin system , 1982 .

[27]  A. Trias,et al.  Gauge dynamics in the C-representation , 1986 .

[28]  L. Crane Clock and category: Is quantum gravity algebraic? , 1995, gr-qc/9504038.

[29]  J. York Dynamical origin of black-hole radiance , 1983 .

[30]  G. Hooft Graviton dominance in ultra-high-energy scattering , 1987 .

[31]  Giorgio Immirzi Real and complex connections for canonical gravity , 1996 .

[32]  A. Ashtekar,et al.  Loops, knots, gauge theories and quantum gravity , 1996 .

[33]  C. S. The Statistical Mechanics of the Three-Dimensional Euclidean Black Hole , 1996 .

[34]  C. Rovelli A Generally covariant quantum field theory and a prediction on quantum measurements of geometry , 1993 .

[35]  Fuzzy spacetime from a null-surface version of general relativity , 1996, gr-qc/9603061.

[36]  A length operator for canonical quantum gravity , 1996, gr-qc/9606092.

[37]  Diffeomorphism-invariant generalized measures on the space of connections modulo gauge transformations , 1993, hep-th/9305045.

[38]  An Introduction to spin foam models of quantum gravity and BF theory , 1999, gr-qc/9905087.

[39]  Quantum observables and recollapsing dynamics , 1994, gr-qc/9404053.

[40]  Rovelli,et al.  Knot theory and quantum gravity. , 1988, Physical review letters.

[41]  J. Bekenstein Black Holes and Entropy , 1973, Jacob Bekenstein.

[42]  Kodama,et al.  Holomorphic wave function of the Universe. , 1990, Physical review. D, Particles and fields.

[43]  Rovelli,et al.  Spin networks and quantum gravity. , 1995, Physical review. D, Particles and fields.

[44]  James B. Hartle,et al.  The Quantum mechanics of cosmology , 1991, 1805.12246.

[45]  Roger Penrose,et al.  The twistor programme , 1977 .

[46]  B. Brügmann,et al.  Intersecting N loop solutions of the hamiltonian constraint of quantum gravity , 1991 .

[47]  A. Trias,et al.  Geometrical origin of gauge theories , 1981 .

[48]  Rovelli Quantum mechanics without time: A model. , 1990, Physical review. D, Particles and fields.

[49]  Edge states in gravity and black hole physics , 1994, gr-qc/9412019.

[50]  Quantizing Regge calculus , 1995, gr-qc/9512040.

[51]  V. Husain Intersecting-loop solutions of the hamiltonian constraint of quantum general relativity , 1989 .

[52]  K. Ezawa NONPERTURBATIVE SOLUTIONS FOR CANONICAL QUANTUM GRAVITY : AN OVERVIEW , 1996, gr-qc/9601050.

[53]  John Ellis,et al.  Tests of quantum gravity from observations of γ-ray bursts , 1998, Nature.

[54]  Carlo Rovelli,et al.  Discreteness of area and volume in quantum gravity [Nucl. Phys. B 442 (1995) 593] , 1994, gr-qc/9411005.

[55]  C. Rovelli Conceptual foundations of quantum field theory: ‘Localization’ in quantum field theory: how much of QFT is compatible with what we know about space-time? , 1999 .

[56]  Lee Smolin,et al.  Quantum geometry with intrinsic local causality , 1998 .

[57]  Spacetime Quantum Mechanics and the Quantum Mechanics of Spacetime , 1993, gr-qc/9304006.

[58]  John C. Baez,et al.  Gauge Fields, Knots and Gravity , 1994 .

[59]  How the Jones polynomial gives rise to physical states of quantum general relativity , 1992, hep-th/9203040.

[60]  J. Barrett 0 01 00 50 v 1 1 2 O ct 2 00 0 State Sum Models and Quantum Gravity , 2008 .

[61]  Quantization of diffeomorphism invariant theories of connections with local degrees of freedom , 1995, gr-qc/9504018.

[62]  Sóstenes Lins,et al.  Temperley-Lieb Recoupling Theory and Invariants of 3-Manifolds (AM-134) , 1994 .

[63]  Barbero G Jf From Euclidean to Lorentzian general relativity: The real way. , 1996 .

[64]  M. Blencowe The Hamiltonian constraint in quantum gravity , 1990 .

[65]  C. Rovelli,et al.  Weave States in Loop Quantum Gravity , 1997 .

[66]  C. Rovelli Statistical mechanics of gravity and the thermodynamical origin of time , 1993 .

[67]  The physical Hamiltonian in nonperturbative quantum gravity. , 1993, Physical review letters.

[68]  Carlo Rovelli,et al.  Loop space representation of quantum general relativity , 1988 .

[69]  R. Penrose The emperor's new mind: concerning computers, minds, and the laws of physics , 1989 .

[70]  Closed formula for the matrix elements of the volume operator in canonical quantum gravity , 1996, gr-qc/9606091.

[71]  Spin Networks in Nonperturbative Quantum Gravity , 1995, gr-qc/9504036.

[72]  C. Rovelli The statistical state of the universe , 1993 .

[73]  Volume and quantizations , 1996, gr-qc/9602035.

[74]  Ashtekar formulation of general relativity and loop space nonperturbative quantum gravity: A Report , 1991 .

[75]  Matrix elements of Thiemann's Hamiltonian constraint in loop quantum gravity , 1997, gr-qc/9703090.

[76]  Rodolfo Gambini,et al.  Nonstandard optics from quantum space-time , 1999 .

[77]  Loop representations for (2+1) gravity on a torus , 1993, gr-qc/9303019.

[78]  Rovelli,et al.  Weaving a classical metric with quantum threads. , 1992, Physical review letters.

[79]  Fotini Markopoulou Quantum causal histories , 2000 .

[80]  Representation Theory of Analytic Holonomy C* Algebras , 1993, gr-qc/9311010.

[81]  Lee Smolin,et al.  The Bekenstein Bound, Topological Quantum Field Theory and Pluralistic Quantum Field Theory , 1995 .

[82]  Giorgio Immirzi Quantum gravity and Regge calculus , 1996 .

[84]  Fizikos ir matematikos institutas,et al.  Mathematical apparatus of the theory of angular momentum , 1962 .

[85]  Rovelli,et al.  Time in quantum gravity: An hypothesis. , 1991, Physical review. D, Particles and fields.

[86]  C. Rovelli,et al.  Relational Quantum Mechanics , 2006 .

[87]  T. Thiemann Quantum spin dynamics (QSD) V: Quantum Gravity as the natural regulator of the Hamiltonian constraint of matter quantum field theories , 1998 .

[88]  A. Higuchi Linearized gravity in de Sitter spacetime as a representation of SO(4, 1) , 1991 .

[89]  C. Kozameh,et al.  GR via characteristic surfaces , 1995, gr-qc/9502028.

[90]  R. Penrose Angular Momentum: an Approach to Combinatorial Space-Time , 1971 .

[91]  A. Ashtekar Lectures on Non-Perturbative Canonical Gravity , 1991 .

[92]  Rovelli,et al.  Fermions in quantum gravity. , 1994, Physical review letters.

[93]  Rigorous solution of the quantum Einstein equations. , 1996 .

[94]  H. Gausterer,et al.  Geometry and Quantum Physics , 2000 .

[95]  Linking topological quantum field theory and nonperturbative quantum gravity , 1995, gr-qc/9505028.

[96]  K. Krasnov,et al.  Ambiguities in Loop Quantization:. Area VS. Electric Charge , 1998 .

[97]  Gluing 4-simplices: a derivation of the Barrett-Crane spin foam model for Euclidean quantum gravity , 2000, gr-qc/0010031.

[98]  Rovelli,et al.  Gravitons and loops. , 1991, Physical review. D, Particles and fields.

[99]  B. Bruegmann,et al.  Knot invariants as nondegenerate states of four-dimensional quantum gravity , 1991 .

[100]  Worldsheet formulations of gauge theories and gravity , 1994, gr-qc/9412035.

[101]  R. Pietri,et al.  Barrett-Crane model from a Boulatov-Ooguri field theory over a homogeneous space , 1999, hep-th/9907154.

[102]  A. Ashtekar,et al.  2+1 quantum gravity as a toy model for the 3+1 theory , 1989 .

[103]  J. Bekenstein,et al.  Spectroscopy of the quantum black hole , 1995, gr-qc/9505012.

[104]  L. Smolin,et al.  Nonperturbative quantum geometries , 1988 .

[105]  Vassiliev Invariants and the Loop States in Quantum Gravity , 1993, gr-qc/9310035.

[106]  Carlo Rovelli,et al.  The Immirzi parameter in quantum general relativity , 1998 .

[107]  R. Wald Quantum Field Theory in Curved Spacetime and Black Hole Thermodynamics , 1994 .

[108]  C. J. Isham,et al.  Quantum logic and the histories approach to quantum theory , 1993 .

[109]  M. Reisenberger,et al.  A left-handed simplicial action for Euclidean general relativity , 1996, gr-qc/9609002.

[110]  John C. Baez,et al.  Knots and quantum gravity , 1994 .

[111]  Carlo Rovelli Strings, loops and others: a critical survey of the present approaches to quantum gravity , 1997 .

[112]  Counting States of Near-Extremal Black Holes. , 1996, Physical review letters.

[113]  Kirill V.Krasnov Quantum Loop Representation for Fermions coupled to Einstein-Maxwell field , 1995, gr-qc/9506029.

[114]  A. Ashtekar,et al.  New variables for classical and quantum gravity. , 1986, Physical review letters.

[115]  John C. Baez,et al.  Spin foam models , 1997, gr-qc/9709052.

[116]  Chris Isham,et al.  The Classification of decoherence functionals: An Analog of Gleason's theorem , 1994 .

[117]  Luis Javier Garay Elizondo,et al.  Quantum-gravity and minimum length , 1995 .

[118]  Mathematical Problems of Non-perturbative Quantum General Relativity , 1993, gr-qc/9302024.

[119]  C. Rovelli Quantum reference systems , 1991 .

[120]  Statistical Entropy of Nonextremal Four-Dimensional Black Holes and U-Duality. , 1996, Physical review letters.

[121]  C. Rovelli,et al.  Loop space representation of quantum fermions and gravity , 1995 .

[122]  On the support of the Ashtekar-Lewandowski measure , 1994, hep-th/9403112.

[123]  Four‐dimensional topological quantum field theory, Hopf categories, and the canonical bases , 1994, hep-th/9405183.

[124]  Di Bartolo C,et al.  Extended loops: A new arena for nonperturbative quantum gravity. , 1994, Physical review letters.

[125]  Quantum Spin Dynamics (QSD) , 1996, gr-qc/9606089.

[126]  Physics with nonperturbative quantum gravity: Radiation from a quantum black hole , 1996, gr-qc/9603064.

[127]  C. Isham TOPOLOGICAL AND GLOBAL ASPECTS OF QUANTUM THEORY , 1983 .

[128]  Carlo Rovelli,et al.  'Sum over surfaces' form of loop quantum gravity , 1997 .

[129]  Gambini,et al.  Knot invariants as nondegenerate quantum geometries. , 1992, Physical review letters.

[130]  Nonextremal black hole microstates and U-duality , 1996, hep-th/9603109.

[131]  C. Rovelli Quantum gravity as a “sum over surfaces” , 1997 .

[132]  Louis H. Kauffman,et al.  Evaluating the Crane-Yetter invariant , 1993 .

[133]  Volume operator in discretized quantum gravity. , 1995, Physical review letters.

[134]  Quantum logic and decohering histories , 1995, quant-ph/9506028.

[135]  Edward Witten,et al.  Quantum field theory and the Jones polynomial , 1989 .

[136]  C. Rovelli Loop Quantum Gravity and Black Hole Physics , 1996, gr-qc/9608032.

[137]  Rovelli Area is the length of Ashtekar's triad field. , 1993, Physical Review D, Particles and fields.

[138]  D. Amati,et al.  Planckian scattering beyond the semiclassical approximation , 1992 .

[139]  Critical behavior of dynamically triangulated quantum gravity in four dimensions , 1992, hep-lat/9204004.

[140]  John C. Baez Spin network states in gauge theory , 1994 .

[141]  Quantum spin dynamics (QSD): II. The kernel of the Wheeler - DeWitt constraint operator , 1996, gr-qc/9606090.

[142]  Geometry eigenvalues and the scalar product from recoupling theory in loop quantum gravity. , 1996, Physical review. D, Particles and fields.

[143]  D. Amati,et al.  Can spacetime be probed below the string size , 1989 .

[144]  Rodolfo Gambini,et al.  The loop representation , 1996 .

[145]  T. Thiemann An Account of Transforms on A/G , 1995 .

[146]  S. Hawking Particle creation by black holes , 1975 .

[147]  C. Rovelli,et al.  Gravitons from loops: non-perturbative loop-space quantum gravity contains the graviton-physics approximation , 1994 .

[148]  A. Ashtekar,et al.  SU(N) quantum Yang-Mills theory in two-dimensions: A Complete solution , 1997 .

[149]  C. Rovelli What is observable in classical and quantum gravity , 1991 .

[150]  B. Brügmann,et al.  On the constraints of quantum gravity in the loop representation , 1993 .

[151]  Differential geometry on the space of connections via graphs and projective limits , 1994, hep-th/9412073.

[152]  C. Rovelli,et al.  Spin foams as Feynman diagrams , 2000, gr-qc/0002083.

[153]  Anomaly-free formulation of non-perturbative, four-dimensional Lorentzian quantum gravity , 1996, gr-qc/9606088.

[154]  C. Rovelli,et al.  Quantization of the null-surface formulation of general relativity , 1997 .

[155]  H. Stowell The emperor's new mind R. Penrose, Oxford University Press, New York (1989) 466 pp. $24.95 , 1990, Neuroscience.

[156]  Rovelli Quantum evolving constants. Reply to "Comment on 'Time in quantum gravity: An hypothesis' " , 1991, Physical Review D, Particles and fields.

[157]  K. Krasnov Geometrical entropy from loop quantum gravity , 1997 .

[158]  P. González-Díaz On the wave function of the universe , 1985 .

[159]  J. Kogut,et al.  Hamiltonian Formulation of Wilson's Lattice Gauge Theories , 1975 .

[160]  Quantum theory of geometry: I. Area operators , 1996, gr-qc/9602046.

[161]  Jones polynomials for intersecting knots as physical states of quantum gravity , 1992, hep-th/9202018.

[162]  Edge States and Entanglement Entropy , 1995, hep-th/9512047.

[163]  Moduli‐space structure of knots with intersections , 1996, gr-qc/9604010.

[164]  Carlip Observables, gauge invariance, and time in (2+1)-dimensional quantum gravity. , 1990, Physical review. D, Particles and fields.

[165]  Rovelli,et al.  Basis of the Ponzano-Regge-Turaev-Viro-Ooguri quantum-gravity model is the loop representation basis. , 1993, Physical review. D, Particles and fields.

[166]  J. Ellis,et al.  Potential Sensitivity of Gamma-Ray Burster Observations to Wave Dispersion in Vacuo , 1997, astro-ph/9712103.

[167]  D. Amati,et al.  Superstring collisions at planckian energies , 1987 .

[168]  Loop constraints: A habitat and their algebra , 1997, gr-qc/9710016.

[169]  Outline of a generally covariant quantum field theory and a quantum theory of gravity , 1995, gr-qc/9503067.

[170]  Barbero G Reality conditions and Ashtekar variables: A different perspective. , 1995, Physical review. D, Particles and fields.

[171]  D. Amati,et al.  CLASSICAL AND QUANTUM GRAVITY EFFECTS FROM PLANCKIAN ENERGY SUPERSTRING COLLISIONS , 1988 .

[172]  Loop Representations , 1993, gr-qc/9312001.

[173]  L. Crane,et al.  Relativistic spin networks and quantum gravity , 1997, gr-qc/9709028.

[174]  Spin Foam Models and the Classical Action Principle , 1998, hep-th/9807092.

[175]  J. Kogut,et al.  Phase structure of four dimensional simplicial quantum gravity , 1994, hep-lat/9401026.

[176]  The Gauss Linking Number in Quantum Gravity , 1993, gr-qc/9310025.

[177]  Noah Linden,et al.  Quantum temporal logic and decoherence functionals in the histories approach to generalized quantum theory , 1994 .

[178]  The complete spectrum of the area from recoupling theory in loop quantum gravity , 1996, gr-qc/9608043.

[179]  A. Ashtekar,et al.  NEW LOOP REPRESENTATIONS FOR 2+1 GRAVITY , 1994, gr-qc/9405031.