Published April 28, 2009
| Submitted
Discussion Paper
Open
Ghost-free, finite, fourth order D=3 (alas) gravity
- Creators
-
Deser, S.
Chicago
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Abstract
Canonical analysis of a recently proposed [1] linear+quadratic curvature gravity model in D=3 displays its pure fourth derivative quadratic branch as a ghost-free (massless) excitation. Hence it both negates an old no-go theorem and is power-counting UV finite. It is also conformal-invariant, so the metric is underdetermined. While the 2-term branch is also ghost-free, it has, as shown in [1], a second-derivative, two-tensor equivalent, akin to the second order scalar-tensor form of ostensibly fourth order, R+R^2, actions. This correspondence fails for the pure quadratic branch: it is irreducibly fourth-order.
Additional Information
I thank Paul Townsend for a conversation at the Imperial College Duffest where this work was begun, for later informing me that O. Hohm had also noted the "motivational", G(h) ↔ O(0)X, argument in text and for subsequently insisting that since massive FP exorcizes ghosts, they must also disappear (as indeed they finally did) from the massive metric form. This work was supported by Grants NSF 07-57190 and DOE DE-FG02-92-ER40701.Attached Files
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Additional details
- Eprint ID
- 72929
- Resolver ID
- CaltechAUTHORS:20161219-091830306
- NSF
- PHY07-57190
- Department of Energy (DOE)
- DE-FG02-92-ER40701
- Created
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2016-12-19Created from EPrint's datestamp field
- Updated
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2023-06-02Created from EPrint's last_modified field