Space-time theories and symmetry groups

Foundations of Physics 14 (4):307 (1984)
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Abstract

This paper addresses the significance of the general class of diffeomorphisms in the theory of general relativity as opposed to the Poincaré group in a special relativistic theory. Using Anderson's concept of an absolute object for a theory, with suitable revisions, it is shown that the general group of local diffeomorphisms is associated with the theory of general relativity as its local dynamical symmetry group, while the Poincaré group is associated with a special relativistic theory as both its global dynamical symmetry group and its geometrical symmetry group. It is argued that the two groups are of equal significance as symmetry groups of their associated theories

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10.1007/bf00738921

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Citations of this work

Absolute objects and counterexamples: Jones--Geroch dust, Torretti constant curvature, tetrad-spinor, and scalar density.J. Brian Pitts - 2006 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 37:347-71.
Absolute objects and counterexamples: Jones–Geroch dust, Torretti constant curvature, tetrad-spinor, and scalar density.J. Brian Pitts - 2006 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 37 (2):347-371.
Absolute objects and counterexamples: Jones–Geroch dust, Torretti constant curvature, tetrad-spinor, and scalar density.J. Brian Pitts - 2006 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 37 (2):347-371.
Is there a relativistic thermodynamics? A case study of the meaning of special relativity.Chuang Liu - 1994 - Studies in History and Philosophy of Science Part A 25 (6):983-1004.

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References found in this work

Covariance, invariance, and the equivalence of frames.J. Earman - 1974 - Foundations of Physics 4 (2):267-289.

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