Hostname: page-component-848d4c4894-2pzkn Total loading time: 0 Render date: 2024-05-15T15:07:06.507Z Has data issue: false hasContentIssue false
  • English
  • Français

Relativistic Quantum Mechanics through Frame-Dependent Constructions

Published online by Cambridge University Press:  01 January 2022

Jeffrey A. Barrett
Get access Rights & Permissions [Opens in a new window]

Abstract

This paper is concerned with the possibility and nature of relativistic hidden-variable formulations of quantum mechanics. Both ad hoc teleological constructions and frame-dependent constructions of spacetime maps are considered. While frame-dependent constructions are clearly preferable, a many-maps theory based on such constructions fails to provide dynamical explanations for local quantum events. Here the hidden-variable dynamics used in the frame-dependent constructions is just a rule that serves to characterize the set of all possible spacetime maps. While not having dynamical explanations of the values of quantum-mechanical measurement records is a significant cost, it may prove too much to ask for dynamical explanations in relativistic quantum mechanics.

Type
Quantum Mechanics
Information
Philosophy of Science , Volume 72 , Issue 5: Proceedings of the 2004 Biennial Meeting of The Philosophy of Science Association. Part I: Contributed Papers , December 2005 , pp. 802 - 813
Copyright
Copyright © The Philosophy of Science Association

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

Footnotes

I would like to thank David Malament, Brian Woodcock, and Katherine Peters for helpful discussions and comments on an earlier version of this paper.

References

Aharonov, Y., and Albert, D. Z. (1981), “Can We Make Sense out of the Measurement Process in Relativistic Quantum Mechanics?”, Can We Make Sense out of the Measurement Process in Relativistic Quantum Mechanics? 24:359370.Google Scholar
Albert, D. Z. (1992), Quantum Mechanics and Experience. Cambridge, MA: Harvard University Press.Google Scholar
Albert, D. Z. (1999), “Special Relativity as an Open Question”, in Breuer, H. and Petruccione, F. (eds.), State Vector Reduction in Relativistic Quantum Theory. Proceedings of the Workshop held at the Instituto Italiano per gli Studi Filosofici, Naples, April 3–4, 1998. Berlin: Springer Verlag, 130.Google Scholar
Barrett, J. A. (1999), The Quantum Mechanics of Minds and Worlds. Oxford: Oxford University Press.Google Scholar
Barrett, J. A. (2000), “The Persistence of Memory: Surreal Trajectories in Bohm’s Theory”, The Persistence of Memory: Surreal Trajectories in Bohm’s Theory 67:680703.Google Scholar
Barrett, J. A. (2002), “On the Nature of Measurement Records in Relativistic Quantum Field Theory”, in Kuhlmann, M., Lyre, H., and Wayne, A. (eds.), Ontological Aspects of Quantum Field Theory. River Edge, NJ: World Scientific, 165179.CrossRefGoogle Scholar
Barrett, J. A. (2003) “Are Our Best Physical Theories Probably and/or Approximately True?”, Are Our Best Physical Theories Probably and/or Approximately True? 70:12061218.Google Scholar
Bell, J. S. (1981), “Quantum Mechanics for Cosmologists”, in Isham, C., Penrose, R., and Sciama, D. (eds.), Quantum Gravity 2. Oxford: Clarendon, 611–637. Reprinted in J. S. Bell, Speakable and Unspeakable in Quantum Theory. Cambridge: Cambridge University Press, 1987, 117138.Google Scholar
Bell, J. S. (1982), “On the Impossible Pilot Wave”, On the Impossible Pilot Wave 12:989–899. Reprinted in J. S. Bell, Speakable and Unspeakable in Quantum Theory. Cambridge: Cambridge University Press, 1987, 159–168.Google Scholar
Bell, J. S. (1984), “Beables for Quantum Field Theory”, CERN-TH. 4035/84. Reprinted in J. S. Bell, Speakable and Unspeakable in Quantum Theory. Cambridge: Cambridge University Press, 1987, 173180.Google Scholar
Bell, J. S. (1987), Speakable and Unspeakable in Quantum Theory. Cambridge: Cambridge University Press.Google Scholar
Bloch, I. (1967), “Some Relativistic Oddities in the Quantum Theory of Observation”, Some Relativistic Oddities in the Quantum Theory of Observation 156:13771384.Google Scholar
Bohm, D. (1952), “A Suggested Interpretation of Quantum Theory in Terms of ‘Hidden Variables’”, parts I and II, Physical Review 85:166179, 180–193.CrossRefGoogle Scholar
Bohm, D., and Hiley, B. J. (1993), The Undivided Universe: An Ontological Interpretation of Quantum Theory. London: Routledge.Google Scholar
Bub, J. (1997), Interpreting the Quantum World. Cambridge: Cambridge University Press.Google Scholar
Dickson, M. (1998), Quantum Chance and Nonlocality. Cambridge: Cambridge University Press.CrossRefGoogle Scholar
Hellwig, K.-E., and Kraus, K. (1970), “Formal Description of Measurements in Local Quantum Field Theory”, Formal Description of Measurements in Local Quantum Field Theory 1:566571.Google Scholar
Holland, P. (1993), The Quantum Theory of Motion. Cambridge: Cambridge University Press.CrossRefGoogle Scholar
Kochen, S., and Specker, E. P. (1967), “The Problem of Hidden Variables in Quantum Mechanics”, The Problem of Hidden Variables in Quantum Mechanics 17:5987.Google Scholar
Malament, D. (1996), “In Defense of Dogma: Why There Cannot Be a Relativistic Quantum Mechanics of (Localizable) Particles”, in Clifton, R. (ed.), Perspectives on Quantum Reality. Dordrecht: Kluwer, 110.Google Scholar
Maudlin, T. (1994), Quantum Nonlocality and Relativity. Oxford: Blackwell.Google Scholar
Maudlin, T. (1996), “Spacetime in the Quantum World”, in Cushing, J. T., Fine, A., and Goldstein, S. (eds.), Bohmian Mechanics and Quantum Theory: An Appraisal. Dordrecht: Kluwer, 285307.CrossRefGoogle Scholar
Schlieder, S. (1968), “Einige Bemerkungen zur Zustandsänderung von relativistischen quantenmechanischen Systemen durch Messungen und zur Lokalitätsforderung”, Einige Bemerkungen zur Zustandsänderung von relativistischen quantenmechanischen Systemen durch Messungen und zur Lokalitätsforderung 7:305331.Google Scholar
Vink, J. C. (1993), “Quantum Mechanics in Terms of Discrete Beables”, Quantum Mechanics in Terms of Discrete Beables 48:18081818.Google ScholarPubMed