Curiel, Erik (2018) On Geometric Objects, the Non-Existence of a Gravitational Stress-Energy Tensor, and the Uniqueness of the Einstein Field Equation. [Preprint]
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Abstract
The question of the existence of gravitational stress-energy in
general relativity has exercised investigators in the field since
the inception of the theory. Folklore has it that no adequate
definition of a localized gravitational stress-energetic quantity
can be given. Most arguments to that effect invoke one version or
another of the Principle of Equivalence. I argue that not only are
such arguments of necessity vague and hand-waving but, worse, are
beside the point and do not address the heart of the issue. Based
on a novel analysis of what it may mean for one tensor to depend in
the proper way on another, which, en passant, provides a
precise characterization of the idea of a "geometric object", I
prove that, under certain natural conditions, there can be no tensor
whose interpretation could be that it represents gravitational
stress-energy in general relativity. It follows that gravitational
energy, such as it is in general relativity, is necessarily
non-local. Along the way, I prove a result of some interest in own
right about the structure of the associated jet bundles of the
bundle of Lorentz metrics over spacetime. I conclude by showing
that my results also imply that, under a few natural conditions, the
Einstein field equation is the unique equation relating
gravitational phenomena to spatiotemporal structure, and discuss how
this relates to the non-localizability of gravitational
stress-energy. The main theorem proven underlying all the arguments
is considerably stronger than the standard result in the literature
used for the same purposes (Lovelock's theorem of 1972): it holds in
all dimensions (not only in four); it does not require an assumption
about the differential order of the desired concomitant of the
metric; and it has a more natural physical interpretation.
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| Item Type: | Preprint | ||||||
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| Additional Information: | Forthcoming in *Studies in History and Philosophy of Modern Physics*, 2018 | ||||||
| Keywords: | gravitational energy; stress-energy tensors; concomitants; jet bundles; principle of equivalence; geometric objects; Einstein field equation | ||||||
| Subjects: | Specific Sciences > Physics > Classical Physics Specific Sciences > Physics > Fields and Particles Specific Sciences > Physics > Relativity Theory |
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| Depositing User: | Dr. Erik Curiel | ||||||
| Date Deposited: | 29 Aug 2018 00:03 | ||||||
| Last Modified: | 29 Aug 2018 00:03 | ||||||
| Item ID: | 14980 | ||||||
| Official URL: | http://strangebeautiful.com/papers/curiel-nonexist... | ||||||
| Subjects: | Specific Sciences > Physics > Classical Physics Specific Sciences > Physics > Fields and Particles Specific Sciences > Physics > Relativity Theory |
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| Date: | August 2018 | ||||||
| URI: | https://philsci-archive.pitt.edu/id/eprint/14980 |
Available Versions of this Item
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On Geometric Objects, the Non-Existence of a Gravitational Stress-Energy Tensor, and the Uniqueness of the Einstein
Field Equation. (deposited 30 Aug 2014 00:20)
- On Geometric Objects, the Non-Existence of a Gravitational Stress-Energy Tensor, and the Uniqueness of the Einstein Field Equation. (deposited 29 Aug 2018 00:03) [Currently Displayed]
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