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The Principles of Gauging

Published online by Cambridge University Press:  01 April 2022

Holger Lyre*
Affiliation:
Ruhr-University Bochum
*
Send requests for reprints to the author, Institut für Philosophic Ruhr-Universität Bochum, D-44780 Bochum, Germany; email: holger.lyre@ruhr-uni-bochum.de.

Abstract

The aim of this paper is twofold: First, to present an examination of the principles underlying gauge field theories. I shall argue that there are two principles directly connected to the two well-known theorems of Emmy Noether concerning global and local symmetries of the free matter-field Lagrangian, in the following referred to as “conservation principle” and “gauge principle.” Since both express nothing but certain symmetry features of the free field theory, they are not sufficient to derive a true interaction coupling to a new gauge field. For this purpose it is necessary to advocate a third, truly empirical principle which may be understood as a generalization of the equivalence principle. The second task of the paper is to deal with the ontological question concerning the reality status of gauge potentials in the light of the proposed logical structure of gauge theories. A nonlocal interpretation of topological effects in gauge theories and, thus, the non-reality of gauge potentials in accordance with the generalized equivalence principle will be favored.

Type
Relativity and Fields
Copyright
Copyright © Philosophy of Science Association 2001

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Footnotes

Special thanks to Tim Oliver Eynck for helpful remarks.

References

Aharonov, Yakir and Bohm, David (1959), “Significance of electromagnetic potentials in the quantum theory”, Physical Review 115(3): 485491.10.1103/PhysRev.115.485CrossRefGoogle Scholar
Aitchison, Ian J. R. and Hey, Anthony J. G. (1982), Gauge Theories in Particle Physics—A Practical Introduction. Bristol: Hilger.Google Scholar
Brown, Harvey R. (1999), “Aspects of objectivity in quantum mechanics”, in Butterfield, Jeremy and Pagonis, Constantine (eds.), From Physics to Philosophy. Cambridge: Cambridge University Press, 4570.10.1017/CBO9780511597947.005CrossRefGoogle Scholar
Guttmann, Yair M. and Lyre, Holger (2000), “Fiber Bundle Gauge Theories and ‘Field's Dilemma’”. E-print arXiv:physics/0005051.Google Scholar
Healey, Richard (1997), “Nonlocality and the Aharonov-Bohm effect,” Philosophy of Science 64:1841.10.1086/392534CrossRefGoogle Scholar
Healey, Richard (2000), “On the reality of gauge potentials”, preprint.Google Scholar
Lyre, Holger (1999), “Gauges, Holes, and their ‘Connections’”. To appear in Don A. Howard (ed.), Proceedings of the “Fifth International Conference on the History and Foundations of General Relativity”, Notre Dame, Indiana. E-print arXiv:gr-qc/9904036.Google Scholar
Lyre, Holger (2001), “A generalized equivalence principle”, International Journal of Modern Physics D 10, in press. E-print arXiv:gr-qc/0004054.Google Scholar
Mills, Robert (1989), “Gauge fields”, American Journal of Physics 57(6): 493507.10.1119/1.15984CrossRefGoogle Scholar
Redhead, Michael (2000), “The intelligibility of the universe”, forthcoming in A. O'Hear (ed.), Philosophy at the New Millennium.Google Scholar
Redhead, Michael (2001), “The interpretation of gauge symmetry”. To appear in Meinard Kuhlmann, Holger Lyre, and Andrew Wayne (eds.), Proceedings of the International Conference on “Ontological Aspects of Quantum Field Theory” [October 11–13, 1999], Bielefeld, Germany.Google Scholar
Teller, Paul (2000), “The gauge argument”, Philosophy of Science 67 (Supplement): S466S481.10.1086/392839CrossRefGoogle Scholar
Yang, Chen Ning (1974), “Integral formalism for gauge fields”, Physical Review Letters 33(7): 445447.10.1103/PhysRevLett.33.445CrossRefGoogle Scholar