Field redefinitions in theories beyond Einstein gravity using the language of differential forms

Ezquiaga, José María; García-Bellido, J.; Zumalacárregui, Miguel

doi:10.1103/physrevd.95.084039

Cited by 28 publications

(27 citation statements)

References 73 publications

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“…Our results show that the studies of disformal transformations in scalar-curvature gravity [13,14] can be generalized also to scalar-torsion theories. In this work we have undertaken a first step in this direction, by focusing on general disformal transformations only, and by explicitly constructing an invariant class of actions by applying these transformations to the torsion tensor.…”

Section: Resultsmentioning

confidence: 66%

“…While in the most general class of metric-affine theories the metric and connection may be transformed independently, leading to different notions of invariance under such transformations [9], assuming a more specific geometry limits the possible transformations. In the scalar-curvature class, where the affine connection is fixed as the curvature-free, metric compatible Levi-Civita connection, this leads to the well-known possibility of conformal transformations [10], or the more general class of disformal transformations [11,12] and its extensions [13,14]. The latter are of particular interest, as they connect classes of gravity theories with second order field equations, such as the well-known Horndeski class [15][16][17], to such higher derivative order theories which are healthy in the sense that they avoid Ostrogradsky instabilities due to the presence of constraints arising from degeneracies in their Lagrangians [18][19][20][21].…”

Section: Introductionmentioning

confidence: 99%

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Disformal Transformations in Scalar–Torsion Gravity

Hohmann

2019

Universe

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We study disformal transformations in the context of scalar extensions to teleparallel gravity, in which the gravitational interaction is mediated by the torsion of a flat, metric compatible connection. We find a generic class of scalar-torsion actions which is invariant under disformal transformations, and which possesses different invariant subclasses. For the most simple of these subclasses we explicitly derive all terms that may appear in the action. We propose to study actions from this class as possible teleparallel analogues of healthy beyond Horndeski theories.

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Section: Resultsmentioning

confidence: 66%

Section: Introductionmentioning

confidence: 99%

Disformal Transformations in Scalar–Torsion Gravity

Hohmann

2019

Universe

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“…The conformal transformation and its generalization, the disformal transformation [2], are the powerful tools to connect two different theories. The Horndeski theory, which is the most general scalar-tensor theory with the equation of motion with at most second derivatives [3][4][5][6][7], is transformed into the beyond Horndeski theories [8,9] via the disformal transformation [10][11][12][13][14][15][16]. Although the transformed theory is equivalent to the original theory [17], one should take care that the matter field couple with which metric tensor.…”

Section: Introductionmentioning

confidence: 99%

Novel matter coupling in general relativity via canonical transformation

2018

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We study canonical transformations of general relativity (GR) to provide a novel matter coupling to gravity. Although the transformed theory is equivalent to GR in vacuum, the equivalence no longer holds if a matter field minimally couples to the canonically transformed gravitational field. We find that a naive matter coupling to the transformed field leads to the appearance of an extra mode in the phase space, rendering the theory inconsistent. We then find a consistent and novel way of matter coupling: after imposing a gauge fixing condition, a matter field can minimally couple to gravity without generating an unwanted extra mode. As a result, the way matter field couples to the gravitational field determines the preferred time direction and the resultant theory has only two gravitational degrees of freedom. We also discuss the cosmological solution and linear perturbations around it, and confirm that their dynamics indeed differ from those in GR. The novel matter coupling can be used for a new framework of modified gravity theories. * katsuki-a12@gravity.phys.waseda.ac.jp † Chunshan.Lin@fuw.edu.pl ‡ shinji.mukohyama@yukawa.kyoto-u.ac.jp Recently, the paper [18] provided new class of modi-

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“…*13 To the best of our knowledge, it remains an open question whether these DHOST theories are closed under generic disformal transformations. *14 Apart from this line of research, the authors of Ref [31]. specified all the theories obtained via invertible disformal transformations from the Horndeski class in the language of differential forms.…”

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confidence: 99%

General invertible transformation and physical degrees of freedom

et al. 2017

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An invertible field transformation is such that the old field variables correspond one-to-one to the new variables. As such, one may think that two systems that are related by an invertible transformation are physically equivalent. However, if the transformation depends on field derivatives, the equivalence between the two systems is nontrivial due to the appearance of higher derivative terms in the equations of motion. To address this problem, we prove the following theorem on the relation between an invertible transformation and Euler-Lagrange equations: If the field transformation is invertible, then any solution of the original set of Euler-Lagrange equations is mapped to a solution of the new set of Euler-Lagrange equations, and vice versa. We also present applications of the theorem to scalar-tensor theories.Comment: 14 pages; matches published versio

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Field redefinitions in theories beyond Einstein gravity using the language of differential forms

Cited by 28 publications

References 73 publications

Disformal Transformations in Scalar–Torsion Gravity

Disformal Transformations in Scalar–Torsion Gravity

Novel matter coupling in general relativity via canonical transformation

General invertible transformation and physical degrees of freedom

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