![Go to First Point of Citation](images/ref.gif) |
|
Amelino-Camelia, G. and Stachel, J., 2009, “Measurement of the space-time interval between two
events using the retarded and advanced times of each event with respect to a time-like world-line”,
Gen. Relativ. Gravit., 41, 1107–1124. [ DOI], [ ADS], [ arXiv:0710.5608 [gr-qc]].
|
![Go to First Point of Citation](images/ref.gif) |
|
Anderson, I.M., Fels, M.E. and Torre, C.G., 2000, “Group Invariant Solutions Without
Transversality”, Commun. Math. Phys., 212, 653–686. [ DOI], [ ADS], [ arXiv:math-ph/9910015].
|
![Go to First Point of Citation](images/ref.gif) |
|
Ashtekar, A., 1987, Asymptotic Quantization, Bibliopolis, Napoli, Italy.
|
![Go to First Point of Citation](images/ref.gif) |
|
Ashtekar, A., 2010, “The Issue of the Beginning in Quantum Cosmology”, in Einstein and the
Changing Worldviews of Physics, Proceedings of the 7th Conference on the History of General
Relativity, La Orotava, Tenerife, March 2005, (Eds.) Lehner, C., Renn, J., Schemmel, M., Einstein
Studies, 12, pp. 347–363, Birkhäuser, Boston; Basel.
|
![Go to First Point of Citation](images/ref.gif) |
|
Ashtekar, A. and Pierri, M., 1996, “Probing quantum gravity through exactly soluble
midi-superspaces I”, J. Math. Phys., 37, 6250–6270. [ DOI], [ ADS], [ arXiv:gr-qc/9606085].
|
![Go to First Point of Citation](images/ref.gif) |
|
Ashtekar, A., Tate, R. and Uggla, C., 1993a, “Minisuperspaces: Observables and Quantization”, Int.
J. Mod. Phys. D, 2, 15–50. [ DOI], [ ADS], [ arXiv:gr-qc/9302027].
|
![Go to First Point of Citation](images/ref.gif) |
|
Ashtekar, A., Tate, R.S. and Uggla, C., 1993b, “Minisuperspaces: Symmetries and Quantization”,
in Directions in General Relativity, Vol. 1, Proceedings of the 1993 International Symposium,
Maryland: Papers in honor of Charles Misner, (Eds.) Hu, B.L., Ryan Jr, M.P., Vishveswara, C.V.,
pp. 29–42, Cambridge University Press, Cambridge; New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Ashtekar, A., Bičák, J. and Schmidt, B.G., 1997a, “Asymptotic structure of symmetry-reduced
general relativity”, Phys. Rev. D, 55, 669–686. [ DOI], [ ADS], [ arXiv:gr-qc/9608042].
|
![Go to First Point of Citation](images/ref.gif) |
|
Ashtekar, A., Bičák, J. and Schmidt, B.G., 1997b, “Behavior of Einstein-Rosen waves at null
infinity”, Phys. Rev. D, 55, 687–694. [ DOI], [ ADS], [ arXiv:gr-qc/9608041].
|
![Go to First Point of Citation](images/ref.gif) |
|
Belot, G. and Earman, J., 2001, “Pre-Socratic quantum gravity”, in Physics Meets Philosophy at
the Planck Scale: Contemporary Theories in Quantum Gravity, (Eds.) Callender, C., Huggett, N.,
chap. 10, pp. 213–255, Cambridge University Press, Cambridge; New York. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Bergmann, P.G., 1957, “Topics in the Theory of General Relativity”, in Lectures in Theoretical
Physics: Brandeis Summer Institute, 1957, Brandeis Summer School 1957, pp. 1–44, W.A.
Benjamin, New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Bergmann, P.G. and Smith, G.J., 1982, “Measurability Analysis for the Linearized Gravitational
Field”, Gen. Relativ. Gravit., 14, 1131–1166. [ DOI], [ ADS].
|
![Go to First Point of Citation](images/ref.gif) |
|
Bičák, J., 2000, “Exact radiative spacetimes: some recent developments”, Ann. Phys. (Leipzig),
9, 207–216. [ DOI], [ ADS], [ gr-qc/0004031].
|
![Go to First Point of Citation](images/ref.gif) |
|
Bohr, N. and Rosenfeld, L., 1933, “Zur Frage der Messbarkeit der elektromagnetischen Feldgrössen”,
Mat.-Fys. Medd. K. Dan. Vid. Selsk., 12(8), 3–65. Online version (accessed 15 May 2013):
http://www.sdu.dk/en/bibliotek/materiale+efter+type/hostede+ressourcer/matfys.
|
![Go to First Point of Citation](images/ref.gif) |
|
Bohr, N. and Rosenfeld, L., 1979, “On the Question of the Measurability of Electromagnetic Field
Quantities”, in Selected Papers of Léon Rosenfeld, (Eds.) Cohen, R.S., Stachel, J., Boston Studies
in the Philosophy of Science, 21, pp. 357–400, D. Reidel, Dordrecht; Boston. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Bradonjić, K. and Stachel, J., 2012, “Unimodular conformal and projective relativity”, Europhys.
Lett., 97, 10001. [ DOI], [ ADS], [ arXiv:1110.2159 [gr-qc]].
|
![Go to First Point of Citation](images/ref.gif) |
|
Bruhat, Y., 1962, “The Cauchy Problem”, in Gravitation: An Introduction to Current Research,
(Ed.) Witten, L., pp. 130–168, Wiley, New York; London.
|
![Go to First Point of Citation](images/ref.gif) |
|
Darmois, G., 1927, Les équations de la gravitation einsteinienne, Mémorial des Sciences
Mathématiques, 25, Gauthier-Villars, Paris. Online version (accessed 14 May 2013):
http://www.numdam.org/item?id=MSM_1927__25__1_0.
|
![Go to First Point of Citation](images/ref.gif) |
|
DeWitt, B.S., 2003, The Global Approach to Quantum Field Theory, 2 vols., International Series of
Monographs on Physics, 114, Clarendon Press, Oxford; New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Dorato, M., 2000, “Substantivalism, Relationism, and Structural Spacetime Realism”, Found. Phys.,
30, 1605–1628. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Dosch, H.G., Müller, V.F. and Sieroka, N., 2005, Quantum Field Theory in a Semiotic Perspective,
Math.-Phys. Kl. Heidelberger Akad. Wiss., 17, Springer, Berlin; New York. [ Google Books]. Online
version (accessed 16 November 2013):
http://philsci-archive.pitt.edu/1624/.
|
![Go to First Point of Citation](images/ref.gif) |
|
Doughty, N.A., 1990, Lagrangian Interaction: An Introduction to Relativistic Symmetry in
Electrodynamics and Gravitation, Addison-Wesley, Reading, MA.
|
![Go to First Point of Citation](images/ref.gif) |
|
Earman, J., 1989, World Enough and Space-Time: Absolute Versus Relational Theories of Space and
Time, MIT Press Classics, MIT Press, Cambridge, MA; London.
|
![Go to First Point of Citation](images/ref.gif) |
|
Earman, J., 2004, “Laws, Symmetry, and Symmetry Breaking: Invariance, Conservation Principles,
and Objectivity”, Philos. Sci., 71, 1227–1241. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Earman, J., 2006, “Two Challenges to the Requirement of Substantive General Covariance”,
Synthese, 148, 443–468. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Earman, J. and Norton, J.D., 1987, “What Price Spacetime Substantivalism? The Hole Story”, Brit.
J. Phil. Sci., 38, 515–525. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Ehlers, J., 1973, “The Nature and Structure of Spacetime”, in The Physicist’s Conception of Nature,
Symposium on the Development of the Physicist’s Conception of Nature in the Twentieth Century,
held in Trieste, Italy, 18 – 25 September 1972, (Ed.) Mehra, J., pp. 71–91, D. Reidel, Dordrecht;
Boston. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Einstein, A., 1905, “Zur Elektrodynamik bewegter Körper”, Ann. Phys. (Leipzig), 17, 891–921.
[ DOI]. Online version (accessed 15 May 2013):
http://echo.mpiwg-berlin.mpg.de/MPIWG:FDQUK2HX.
|
![Go to First Point of Citation](images/ref.gif) |
|
Einstein, A., 1916, “Die Grundlage der allgemeinen Relativitätstheorie”, Ann. Phys. (Leipzig), 49,
769–822. [ DOI]. Online version (accessed 15 May 2013):
http://echo.mpiwg-berlin.mpg.de/MPIWG:ACAKHYZX.
|
![Go to First Point of Citation](images/ref.gif) |
|
Einstein, A., 1918, “Prinzipielles zur allgemeinen Relativitätstheorie”, Ann. Phys. (Leipzig), 55,
241–244. [ DOI]. Online version (accessed 15 May 2013):
http://echo.mpiwg-berlin.mpg.de/MPIWG:T40G38NP.
|
![Go to First Point of Citation](images/ref.gif) |
|
Einstein, A., 1931, “Einstein Says ‘Several’ Here Understand Relativity Theory”, New York Times,
(March 5).
|
![Go to First Point of Citation](images/ref.gif) |
|
Einstein, A., 1952, Relativity: The Special and the General Theory, Crown, New York, 15th edn.
[ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Einstein, A., 1955, The Meaning of Relativity, Stafford Little Lectures, 1921, Princeton University
Press, Princeton, NJ, 5th edn. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Einstein, A., 1956, “Autobiographische Skizze”, in Helle Zeit–Dunkle Zeit: In memoriam Albert
Einstein, (Ed.) Seelig, C., pp. 9–17, Europa Verlag, Zürich; Stuttgart.
|
![Go to First Point of Citation](images/ref.gif) |
|
Engler, F.O. and Renn, J., 2013, “Hume, Einstein und Schlick über die Objektivität der
Wissenschaft”, in Moritz Schlick – Die Rostocker Jahre und ihr Einfluss auf die Wiener Zeit, 3.
Internationales Rostocker Moritz-Schlick-Symposium, November 2011, (Eds.) Engler, F.O., Iven,
M., Schlickiana, 6, pp. 123–156, Leipziger Universitätsverlag, Leipzig.
|
![Go to First Point of Citation](images/ref.gif) |
|
Fatibene, L. and Francaviglia, M., 2003, Natural and Gauge Natural Formalism for Classical Field
Theories: A Geometric Perspective including Spinors and Gauge Theories, Kluwer Academic,
Dordrecht; Norwell, MA.
|
![Go to First Point of Citation](images/ref.gif) |
|
Fatibene, L., Francaviglia, M. and Raiteri, M., 2001, “Gauge natural field theories and applications
to conservation laws”, in Differential geometry and its applications, 8th International conference on
Differential Geometry and its Applications, Opava, Czech Republic, August 27 – 31, 2001, (Eds.)
Kowalski, O., Krupka, D., Slovák, J., 3, pp. 401–413, Silesian University, Opava, Czech Republic.
URL (accessed 15 May 2013):
http://conferences.math.slu.cz/8icdga/proceedings.html.
|
![Go to First Point of Citation](images/ref.gif) |
|
Fine, A. and Leplin, J. (Eds.), 1989, PSA 1988, Volume Two, Proceedings of the 1988 Biennial
Meeting of the Philosophy of Science Association, held in Evanston, IL, USA, Philosophy of Science
Association, East Lansing, MI.
|
![Go to First Point of Citation](images/ref.gif) |
|
French, S. and Ladyman, J., 2003, “Remodelling Structural Realism: Quantum Physics and the
Metaphysics of Structure”, Synthese, 136, 31–56. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Göckeler, M. and Schücker, T., 1987, Differential geometry, gauge theories, and gravity, Cambridge
Monographs on Mathematical Physics, Cambridge University Press, Cambridge; New York. [ Google
Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Goenner, H., 1996, Einführung in die spezielle und allgemeine Relativitätstheorie, Spektrum,
Heidelberg; Oxford.
|
![Go to First Point of Citation](images/ref.gif) |
|
Greene, B., 2004, The Fabric of the Cosmos: Space, Time, and the Texture of Reality, Alfred A.
Knopf, New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Hall, G.S., 2004, Symmetries and Curvature Structure in General Relativity, World Scientific Lecture
Notes in Physics, 46, World Scientific, Singapore; River Edge, NJ. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Hawking, S.W. and Ellis, G.F.R., 1973, The Large Scale Structure of Space-Time, Cambridge
Monographs on Mathematical Physics, Cambridge University Press, Cambridge. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Healey, R., 2001, “On the Reality of Gauge Potentials”, Philos. Sci., 68, 432–455. [ DOI], [ PhilSci:328].
|
![Go to First Point of Citation](images/ref.gif) |
|
Hehl, F.W., McCrea, J.D., Mielke, E.W. and Ne’Eman, Y., 1995, “Metric-affine gauge theory of
gravity: field equations, Noether identities, world spinors, and breaking of dilation invariance”,
Phys. Rep., 258, 1–171. [ DOI], [ ADS], [ arXiv:gr-qc/9402012].
|
![Go to First Point of Citation](images/ref.gif) |
|
Henry, S., 2006, “Metaphysical Disputation on Haecceitism and the Principle of the Identity of
Indiscernibles”, Ex Nihilo, 6, 19–34. Online version (accessed 7 May 2013):
http://hdl.handle.net/2152/13598.
|
![Go to First Point of Citation](images/ref.gif) |
|
Hermann, R., 1973, Geometry, Physics and Systems, Pure and Applied Mathematics, 18, Dekker,
New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Hilbert, D., 1917, “Die Grundlagen der Physik (Zweite Mitteilung.)”, Nachr. Koenigl. Gesellsch.
Wiss. Goettingen, Math.-Phys. Kl., 1917, 53–76. Online version (accessed 14 January 2014):
http://www.digizeitschriften.de/dms/resolveppn/?PPN=GDZPPN002504561.
|
![Go to First Point of Citation](images/ref.gif) |
|
Hoefer, C., 1996, “The metaphysics of space-time substantivalism”, J. Philos., 93, 5–27. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Iftime, M. and Stachel, J., 2006, “The hole argument for covariant theories”, Gen. Relativ. Gravit.,
38, 1241–1252. [ DOI], [ ADS], [ arXiv:gr-qc/0512021].
|
![Go to First Point of Citation](images/ref.gif) |
|
Illy, J. (Ed.), 2006, Albert Meets America: How Journalists Treated Genius During Einstein’s 1921
Travels, Johns Hopkins University Press, Baltimore.
|
![Go to First Point of Citation](images/ref.gif) |
|
Isenberg, J.A. and Marsden, J.E., 1982, “A slice theorem for the space of solutions of Einstein’s
equations”, Phys. Rep., 89, 179–222. [ DOI], [ ADS].
|
![Go to First Point of Citation](images/ref.gif) |
|
Isham, C.J., 1999, Modern Differential Geometry for Physicists, World Scientific Lecture Notes in
Physics, 61, World Scientific, Singapore; River Edge, NJ, 2nd edn. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Jammer, M., 1954, Concepts of Space: The History of Theories of Space in Physics, Harvard
University Press, Cambridge, MA. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Janssen, M., 2007, “What Did Einstein Know and When Did He Know It? A Besso Memo
Dated August 1913”, in The Genesis of General Relativity, Vol. 2: Einstein’s Zurich Notebook:
Commentary and Essays, (Ed.) Renn, J., Boston Studies in the Philosophy of Science, 250, pp.
785–838, Springer, Dordrecht. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Kobayashi, S., 1972, Transformation Groups in Differential Geometry, Springer, Berlin; New York.
[ DOI], [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Komar, A., 1958, “Construction of a Complete Set of Observables in the General Theory of
Relativity”, Phys. Rev., 111, 1182–1187. [ DOI], [ ADS].
|
![Go to First Point of Citation](images/ref.gif) |
|
Komar, A., 1973, “The General Relativistic Quantization Program”, in Contemporary Research in
the Foundations and Philosophy of Quantum Theory, Proceedings of a conference held at the
University of Western Ontario, London, Canada, (Ed.) Hooker, C.A., The Western Ontario Series
in Philosophy of Science, 2, pp. 305–327, D. Reidel, Dordrecht; Boston. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Kouletsis, I., Hájíček, P. and Bičák, J., 2003, “Gauge-invariant Hamiltonian dynamics of
cylindrical gravitational waves”, Phys. Rev. D, 68, 104013. [ DOI], [ ADS], [ arXiv:gr-qc/0308032].
|
![Go to First Point of Citation](images/ref.gif) |
|
Kox, A.J., Klein, M.J. and Schulmann, R. (Eds.), 1996, The Collected Papers of Albert Einstein, Vol.
6: The Berlin Years: Writings, 1914–1917, Princeton University Press, Princeton, NJ.
|
![Go to First Point of Citation](images/ref.gif) |
|
Kretschmann, E., 1915a, “Über die prinzipielle Bestimmbarkeit der berechtigten Bezugssysteme
beliebiger Relativitätstheorien (I)”, Ann. Phys. (Leipzig), 48, 907–942. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Kretschmann, E., 1915b, “Über die prinzipielle Bestimmbarkeit der berechtigten Bezugssysteme
beliebiger Relativitätstheorien (II)”, Ann. Phys. (Leipzig), 48, 943–982. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Kretschmann, E., 1917, “Über den physikalischen Sinn der Relativitätspostulate, A. Einsteins neue
und seine ursprüngliche Relativitätstheorie”, Ann. Phys. (Leipzig), 53, 575–614. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Ladyman, J., 1998, “What is Structural Realism?”, Stud. Hist. Philos. Sci., 29, 409–424. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Lanczos, C., 1970, Space Through The Ages: The evolution of geometrical ideas from Pythagoras to
Hilbert and Einstein, Academic Press, London; New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Lawvere, F.W. and Schanuel, S.H., 1997, Conceptual Mathematics: A first introduction to categories,
Cambridge University Press, Cambridge; New York. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Lichnerowicz, A., 1955, Théories relativistes de la gravitation et de l’électromagnétisme: Relativité
générale et théories unitaires, Masson, Paris.
|
![Go to First Point of Citation](images/ref.gif) |
|
Lichnerowicz, A., 1992, “Mathematics and General Relativity: A Recollection”, in Studies in the
History of General Relativity, Proceedings of the 2nd Conference on the History of General
Relativity, Luminy, Marseille, France, 6 – 9 September 1988, (Eds.) Eisenstaedt, J., Kox, A.J.,
Einstein Studies, 3, pp. 103–108, Birkhäuser, Boston; Basel. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Loemker, L.E. (Ed.), 1969, Gottfried Wilhelm Leibniz: Philosophical Papers and Letters, D. Reidel,
Dordrecht. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Lusanna, L. and Pauri, M., 2006, “Explaining Leibniz equivalence as difference of non-inertial
appearances: Dis-solution of the Hole Argument and physical individuation of point-events”, Stud.
Hist. Phil. Mod. Phys., 37, 692–725. [ DOI], [ PhilSci:2714].
|
![Go to First Point of Citation](images/ref.gif) |
|
Lyre, H., 1999, “Gauges, Holes, and their ‘Connections”’, Fifth International Conference on the
History and Foundations of General Relativity, July 8 – 11, 1999, University of Notre Dame, Notre
Dame, Indiana, conference paper. [ ADS], [ arXiv:gr-qc/9904036].
|
![Go to First Point of Citation](images/ref.gif) |
|
Mach, E., 1986, Principles of the Theory of Heat: Historically and Critically Elucidated, Vienna
Circle Collection, 17, D. Reidel, Dordrecht; Boston. [ DOI]. This translation from the 2nd edition,
1900.
|
![Go to First Point of Citation](images/ref.gif) |
|
Mach, E., 1988, Die Mechanik in
ihrer Entwicklung: Historisch-kritisch dargestellt, Philosophiehistorische Texte, Akademie-Verlag,
Berlin.
|
![Go to First Point of Citation](images/ref.gif) |
|
Matteucci, P., 2003, “Einstein-Dirac theory on gauge-natural bundles”, Rep. Math. Phys., 52,
115–139. [ DOI], [ ADS], [ arXiv:gr-qc/0201079].
|
![Go to First Point of Citation](images/ref.gif) |
|
Micanek, R.J. and Hartle, J.B., 1996, “Nearly instantaneous alternatives in quantum mechanics”,
Phys. Rev. A, 54, 3795–3800. [ DOI], [ ADS], [ arXiv:quant-ph/9602023].
|
![Go to First Point of Citation](images/ref.gif) |
|
Michor, P.W., 2008, Topics in Differential Geometry, Graduate Studies in Mathematics, 93, American
Mathematical Society, Providence, RI.
|
![Go to First Point of Citation](images/ref.gif) |
|
Neumann, P.M., Stoy, G.A. and Thompson, E.C., 1994, Groups and Geometry, Oxford University
Press, Oxford; New York. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Nicolai, H. and Peeters, K., 2007, “Loop and Spin Foam Quantum Gravity: A Brief Guide for
Beginners”, in Approaches to Fundamental Physics: An Assessment of Current Theoretical Ideas,
(Eds.) Stamatescu, I.-O., Seiler, E., Lecture Notes in Physics, 721, pp. 151–184, Springer, Berlin;
New York. [ DOI], [ ADS], [ hep-th/0601129].
|
![Go to First Point of Citation](images/ref.gif) |
|
Nijenhuis, A., 1994, “Book Review: ‘Natural operations in differential geometry’, by Ivan Kolář,
Peter W. Michor, and Jan Slovák, Springer-Verlag, Berlin et al., 1993”, Bull. Am. Math. Soc.,
31, 108–112. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Norton, J.D., 1984, “How Einstein found his field equations: 1912–1915”, Hist. Stud. Phys. Sci., 14,
253–316. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Norton, J.D., 1993, “General covariance and the foundations of general relativity: eight decades of
dispute”, Rep. Prog. Phys., 56, 791–858. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Norton, J.D., 2011, “The Hole Argument”, in The Stanford Encyclopedia of Philosophy, (Ed.) Zalta,
E.N., Stanford University, Stanford, CA. URL (accessed 16 November 2013):
http://plato.stanford.edu/archives/fall2011/entries/spacetime-holearg/.
|
![Go to First Point of Citation](images/ref.gif) |
|
Oeckl, R., 2008, “General boundary quantum field theory: Foundations and probability
interpretation”, Adv. Theor. Math. Phys., 12, 319–352. [ ADS], [ arXiv:hep-th/0509122].
|
![Go to First Point of Citation](images/ref.gif) |
|
Oeckl, R., 2013, “A Positive Formalism for Quantum Theory in the General Boundary Formulation”,
Found. Phys., 43, 1206–1232. [ DOI], [ ADS], [ arXiv:1212.5571 [quant-ph]].
|
![Go to First Point of Citation](images/ref.gif) |
|
Olver, P.J., 1995, Equivalence, Invariants, and Symmetry, Cambridge University Press, Cambridge;
New York. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Pais, A., 1982, ‘Subtle is the Lord ...’: The Science and the Life of Albert Einstein, Oxford University
Press, Oxford; New York. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Penrose, R., 1963, “Asymptotic properties of fields and space-times”, Phys. Rev. Lett., 10, 66–68.
[ DOI], [ ADS].
|
![Go to First Point of Citation](images/ref.gif) |
|
Pooley, O., 2000, “Spacetime Realism and Quantum Gravity”, conference paper. Online version
(accessed 15 May 2013):
http://users.ox.ac.uk/~ball0402/research/.
|
![Go to First Point of Citation](images/ref.gif) |
|
Pooley, O., 2006, “Points, Particles, and Structural Realism”, in The Structural Foundations of
Quantum Gravity, (Eds.) Rickles, D., French, S., Saatsi, J., pp. 83–120, Clarendon Press, Oxford;
New York. [ PhilSci:2939].
|
![Go to First Point of Citation](images/ref.gif) |
|
Pooley, O., 2013, “Substantivalist and Relationalist Approaches to Spacetime”, in The Oxford
Handbook of Philosophy of Physics, (Ed.) Batterman, R., Oxford Handbooks in Philosophy, Oxford
University Press, Oxford; New York. [ PhilSci:9055].
|
![Go to First Point of Citation](images/ref.gif) |
|
Prugovečki, E., 1992, Quantum Geometry: A Framework for Quantum General Relativity,
Fundamental Theories of Physics, 48, Kluwer Academic, Dordrecht; Boston. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Reisenberger, M.P. and Rovelli, C., 2002, “Spacetime states and covariant quantum theory”, Phys.
Rev. D, 65, 125016. [ DOI], [ arXiv:gr-qc/0111016].
|
![Go to First Point of Citation](images/ref.gif) |
|
Renn, J. (Ed.), 2007, The Genesis of General Relativity, Vol. 1: Einsteins’s Zurich Notebook:
Introduction and Source, Boston Studies in the Philosophy of Science, 250, Springer, Dordrecht.
[ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Renn, J. and Stachel, J., 2007, “Hilbert’s Foundations of Physics: From a Theory of Everything to
a Constituent of General Relativity”, in The Genesis of General Relativity, Vol. 4: Gravitation in
the Twilight of Classical Physics: The Promise of Mathematics, (Ed.) Renn, J., Boston Studies in
the Philosophy of Science, 250, pp. 1778–1895, Springer, Dordrecht. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Rickles, D.P., 2005, “A new spin on the hole argument”, Stud. Hist. Phil. Mod. Phys., 36, 415–434.
[ DOI], [ PhilSci:1859].
|
![Go to First Point of Citation](images/ref.gif) |
|
Rorty, R., 1967, “Relations, Internal and External”, in The Encylopedia of Philosophy, vol. 7, (Ed.)
Edwards, P., pp. 125–133, Macmillan, New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Rovelli, C., 1991, “What is observable in classical and quantum gravity?”, Class. Quantum Grav., 8,
297–316. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Rovelli, C., 2004, Quantum Gravity, Cambridge Monographs on Mathematical Physics, Cambridge
University Press, Cambridge; New York. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Rynasiewicz, R., 1999, “Kretschmann’s Analysis of Covariance and Relativity Principles”, in The
Expanding Worlds of General Relativity, Proceedings of the 4th Conference on the History of
General Relativity, Berlin 1995, (Eds.) Goenner, H., Renn, J., Ritter, J., Sauer, T., Einstein Studies,
7, pp. 431–462, Birkhäuser, Boston; Basel. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Sánchez-Rodríguez, I., 2008, “Geometrical Structures of Space-Time in General Relativity”, in
Geometry and Physics, XVI International Fall Workshop, Lisbon, Portugal, 5 – 8 September 2007,
(Eds.) Fernandes, R.L., Picken, R., AIP Conference Proceedings, 1023, pp. 202–206, American
Institute of Physics, Melville, NY. [ DOI], [ ADS], [ arXiv:0803.1929 [gr-qc]].
|
![Go to First Point of Citation](images/ref.gif) |
|
Schichl, H., 1997, On the existence of slice theorems for moduli spaces on fiber bundles, Ph.D. thesis,
Universität Wien, Vienna. Online version (accessed 10 January 2014):
http://ubdata.univie.ac.at/AC01930824.
|
![Go to First Point of Citation](images/ref.gif) |
|
Schouten, J.A., 1951, Tensor Analysis for Physicists, Clarendon Press, Oxford.
|
![Go to First Point of Citation](images/ref.gif) |
|
Schouten, J.A., 1954, Ricci-Calculus: An Introduction to Tensor Analysis and Its Geometrical
Applications, Die Grundlehren der Mathematischen Wissenschaften, X, Springer, Berlin;
Heidelberg, 2nd edn. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Schulmann, R., Kox, A.J. and Janssen, M. (Eds.), 1998, The Collected Papers of Albert Einstein, Vol.
8 Bd. 2, The Berlin Years: Correspondence, 1914-1917, Princeton University Press, Princeton,
NJ.
|
![Go to First Point of Citation](images/ref.gif) |
|
Sharpe, R.W., 1997, Differential Geometry: Cartan’s Generalization of Klein’s Erlangen Program,
Graduate Texts in Mathematics, 166, Springer, New York; Berlin. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Sklar, L., 1974, Space, Time, and Spacetime, University of California Press, Berkeley. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1966, “Cylindrical Gravitational News”, J. Math. Phys., 7, 1321–1331. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1969, “Covariant Formulation of the Cauchy Problem in Generalized Electrodynamics
and General Relativity”, Acta Phys. Pol., 35, 689–709.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1979, “The genesis of general relativity”, in Einstein Symposion Berlin, Aus Anlaß der
100. Wiederkehr seines Geburtstages 25. bis 30. März 1979, (Eds.) Nelkowski, H., Hermann, A.,
Poser, H., Schrader, R., Seiler, R., Lecture Notes in Physics, 100, pp. 428–442, Springer, Berlin;
New York. [ DOI], [ ADS]. Reprinted in Stachel, J., Einstein from ‘B’ to ‘Z’, Einstein Studies, vol. 9,
pp. 233–244, Birkhäuser, Boston; Basel.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1980, “The anholonomic Cauchy problem in general relativity”, J. Math. Phys., 21,
1776–1782. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1986, “What a Physicist Can Learn From the Discovery of General Relativity”, in
The Fourth Marcel Grossmann Meeting on recent developments in theoretical and experimental
general relativity, gravitation and relativistic field theories, Proceedings of the meeting held at
the University of Rome ‘La Sapienza’, 17 – 21 June, 1985, (Ed.) Ruffini, R., pp. 1857–1862,
North-Holland; Elsevier, Amsterdam; New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1987, “How Einstein discovered general relativity: A historical tale with some
contemporary morals”, in General Relativity and Gravitation, Proceedings of the 11th International
Conference on General Relativity and Gravitation, Stockholm, July 6 – 12, 1986, (Ed.) MacCallum,
M.A.H., pp. 200–208, Cambridge University Press, Cambridge; New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1989, “Einstein’s Search for General Covariance 1912–1915”, in Einstein and the History
of General Relativity, Based on the proceedings of the 1986 Osgood Hill Conference, North
Andover, Massachusetts, 8 – 11 May, (Eds.) Howard, D., Stachel, J., Einstein Studies, 1, pp. 63–100,
Birkhäuser, Boston; Basel. [ ADS].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1992, “The Early History of the Cauchy Problem in General Relativity, 1916-1937”, in
Studies in the History of General Relativity, Proceedings of the 2nd Conference on the History of
General Relativity, Luminy, Marseille, France, 6 – 9 September 1988, (Eds.) Eisenstaedt, J., Kox,
A.J., Einstein Studies, 3, pp. 407–418, Birkhäuser, Boston; Basel.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1993, “The Meaning of General Covariance: The Hole Story”, in Philosophical Problems
of the Internal and External Worlds: Essays on the Philosophy of Adolf Grünbaum, (Eds.)
Earman, J., Janis, A.I., Massey, G.J., Rescher, N., Pittsburgh-Konstanz Series in the Philosophy
and History of Science, pp. 129–160, University of Pittsburgh Press / Universitätsverlag
Konstanz, Pittsburgh; Konstanz. [ Google Books]. Online version (accessed 25 Novemver 2013):
http://digital.library.pitt.edu/cgi-bin/t/text/text-idx?idno=31735062135235;view=toc;c=pittpress.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 1997, “Feynman Paths and Quantum Entanglement: Is There Any More to the Mystery?”,
in Potentiality, Entanglement and Passion-at-a-Distance: Quantum Mechanical Studies for Abner
Shimony, Vol. 2, (Eds.) Cohen, R.S., Horne, M., Stachel, J., Boston Studies in the Philosophy of
Science, 194, pp. 245–256, Kluwer Academic, Dordrecht; Boston. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 2002, “‘The Relations between Things’ versus ‘The Things Between Relations’: The
Deeper Meaning of the Hole Argument”, in Reading Natural Philosophy: Essays in the History and
Philosophy of Science and Mathematics, (Ed.) Malament, D., pp. 231–266, Open Court, Chicago;
LaSalle. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 2003, “‘Critical Realism’: Wartofsky and Bhaskar”, in Constructivism and Practice:
Towards a Historical Epistemology, (Ed.) Gould, C.C., pp. 137–150, Rowman & Littlefield,
Lanham, MD; Oxford.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 2005, “Structural Realism and Contextual Individuality”, in Hilary Putnam, (Ed.)
Ben-Menahem, Y., Contemporary Philosophy in Focus, pp. 203–219, Cambridge University Press,
Cambridge; New York. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 2006a, “Structure, Individuality, and Quantum Gravity”, in Structural Foundations of
Quantum Gravity, (Eds.) Rickles, D., French, S., Saatsi, J., pp. 53–82, Oxford University Press,
Oxford; New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 2006b, “Albert Einstein: A Man for the Millenium?”, in A Century of Relativity Physics:
XXVIII Spanish Relativity Meeting (ERE 2005), Oviedo, Asturias, Spain, 6 – 10 September 2005,
(Eds.) Mornas, L., Diaz Alonso, J., AIP Conference Proceedings, 841, pp. 195–227, American
Institute of Physics, Melville, NY. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 2007, “The First Two Acts”, in The Genesis of General Relativity, Vol. 2: Einstein’s
Zurich Notebook: Commentary and Essays, (Ed.) Renn, J., Boston Studies in the Philosophy of
Science, 250, pp. 81–111, Springer, Dordrecht. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 2009, “Prolegomena to any future Quantum Gravity”, in Approaches to Quantum Gravity:
Toward a New Understanding of Space, Time and Matter, (Ed.) Oriti, D., pp. 44–67, Cambridge
University Press, Cambridge; New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 2011, “Conformal and projective structures in general relativity”, Gen. Relativ. Gravit.,
43, 3399–3409. [ DOI], [ ADS].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J., 2014, “General Relativity and Differential Geometry: The Einstein Connection”,
in Beyond Einstein, Based upon the conference, Johannes Gutenberg University, Mainz
Germany, 22 – 26 September 2008, (Ed.) Rowe, D., Einstein Studies, Birkhäuser, Boston; Basel.
Forthcoming.
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J. and Bradonjić, K., 2013, “Quantum Gravity: Meaning and Measurement”, arXiv, e-print.
[ ADS], [ arXiv:1302.2285 [gr-qc]].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stachel, J. and Iftime, M., 2005, “Fibered Manifolds, Natural Bundles, Structured Sets, G-Sets
and all that: The Hole Story from Space Time to Elementary Particles”, arXiv, e-print. [ ADS],
[ arXiv:gr-qc/0505138].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stephani, H., 2004, General Relativity: An introduction to the theory of the gravitational field,
Cambridge University Press, Cambridge; New York, 3rd edn. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Stephani, H., Kramer, D., MacCallum, M.A.H., Hoenselaers, C. and Herlt, E., 2003, Exact Solutions
to Einstein’s Field Equations, Cambridge Monographs on Mathematical Physics, Cambridge
University Press, Cambridge; New York, 2nd edn. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Teller, P., 1998, “Quantum Mechanics and Haecceities”, in Interpreting Bodies: Classical and
Quantum Objects in Modern Physics, (Ed.) Castellani, E., pp. 114–141, Princeton University Press,
Princeton, NJ. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Thiemann, T., 2001, “Introduction to Modern Canonical Quantum General Relativity”, arXiv,
e-print. [ arXiv:gr-qc/0110034].
|
![Go to First Point of Citation](images/ref.gif) |
|
Torre, C.G., 1999, “Midisuperspace Models of Canonical Quantum Gravity”, Int. J. Theor. Phys.,
38, 1081–1102. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Torretti, R., 1983, Relativity and Geometry, Foundations and philosophy of science and technology,
Pergamon Press, Oxford; New York. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Trautman, A., 1970, “Fibre bundles associated with space-time”, Rep. Math. Phys., 1, 29–62. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Trautman, A., 1980, “Fiber Bundles, Gauge Fields, and Gravitation”, in General Relativity and
Gravitation: One Hundred Years After the Birth of Albert Einstein, Vol. 1, (Ed.) Held, A., chap. 9,
pp. 287–308, Plenum Press, New York; London.
|
![Go to First Point of Citation](images/ref.gif) |
|
Varadarajan, V.S., 2003, “Vector Bundles and Connections in Physics and Mathematics: Some
Historical Remarks”, in A Tribute to C.S. Seshadri: A Collection of Articles on Geometry and
Representation Theory, Symposium to felicitate C.S. Seshadri’s 70th birthday, held in Chennai,
India, March 1, 2002, (Eds.) Lakshmibai, V., Balaji, V., Mehta, V.B., Nagarajan, K.R., Paranjape,
K., Sankaran, P., Sridharan, R., Trends in Mathematics, pp. 502–541, Birkhäuser, Basel; Boston.
|
![Go to First Point of Citation](images/ref.gif) |
|
Wald, R.M., 1984, General Relativity, University of Chicago Press, Chicago. [ ADS], [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Wartofsky, M.W., 1968, Conceptual Foundations of Scientific Thought: An Introduction to the
Philosophy of Science, Macmillan, New York.
|
![Go to First Point of Citation](images/ref.gif) |
|
Weyl, H., 1923, Raum, Zeit, Materie: Vorlesungen über allgemeine Relativitätstheorie, Julius
Springer, Berlin, 5th edn. [ DOI].
|
![Go to First Point of Citation](images/ref.gif) |
|
Weyl, H., 1946, The Classical Groups: Their Invariants and Representations, Princeton Landmarks
in Mathematics, Princeton University Press, Princeton, NJ, 2nd edn. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Weyl, H., 1949, Philosophy of Mathematics and Natural Science, Princeton University Press,
Princeton, NJ. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Weyl, H., 1950, Space, Time, Matter, Dover Publications, New York. [ Google Books].
|
![Go to First Point of Citation](images/ref.gif) |
|
Wikipedia contributors, “Group action”, online resource, Wikipedia Foundation. URL (accessed 13
December 2013):
http://en.wikipedia.org/wiki/Group_action.
|
![Go to First Point of Citation](images/ref.gif) |
|
Yaglom, I.M., 1979, Simple Non-Euclidean Geometry and Its Physical Basis: An Elementary Account
of Galilean Geometry and the Galilean Principle of Relativity, Heidelberg Science Library, Springer,
New York; Berlin. [ DOI].
|