Journal article
Journal of Mathematics and Physics, vol. 59(7), 2018, p. 072503
APA
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Bekaert, X., & Morand, K. (2018). Connections and dynamical trajectories in generalised Newton-Cartan gravity. II. An ambient perspective. Journal of Mathematics and Physics, 59(7), 072503. https://doi.org/ 10.1063/1.5030328
Chicago/Turabian
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Bekaert, Xavier, and Kevin Morand. “Connections and Dynamical Trajectories in Generalised Newton-Cartan Gravity. II. An Ambient Perspective.” Journal of Mathematics and Physics 59, no. 7 (2018): 072503.
MLA
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Bekaert, Xavier, and Kevin Morand. “Connections and Dynamical Trajectories in Generalised Newton-Cartan Gravity. II. An Ambient Perspective.” Journal of Mathematics and Physics, vol. 59, no. 7, 2018, p. 072503, doi: 10.1063/1.5030328 .
BibTeX Click to copy
@article{xavier2018a,
title = {Connections and dynamical trajectories in generalised Newton-Cartan gravity. II. An ambient perspective},
year = {2018},
issue = {7},
journal = {Journal of Mathematics and Physics},
pages = {072503},
volume = {59},
doi = { 10.1063/1.5030328 },
author = {Bekaert, Xavier and Morand, Kevin}
}
Connections compatible with degenerate metric structures are known to possess peculiar features: on the one hand, the compatibility conditions involve restrictions on the torsion; on the other hand, torsionfree compatible connections are not unique, the arbitrariness being encoded in a tensor field whose type depends on the metric structure. Nonrelativistic structures typically fall under this scheme, the paradigmatic example being a contravariant degenerate metric whose kernel is spanned by a one-form. Torsionfree compatible (i.e. Galilean) connections are characterised by the gift of a two-form (the force field). Whenever the two-form is closed, the connection is said Newtonian. Such a nonrelativistic spacetime is known to admit an ambient description as the orbit space of a gravitational wave with parallel rays. The leaves of the null foliation are endowed with a nonrelativistic structure dual to the Newtonian one, dubbed Carrollian spacetime. We propose a generalisation of this unifying framework by introducing a new non-Lorentzian ambient metric structure of which we study the geometry. We characterise the space of (torsional) connections preserving such a metric structure which is shown to project to (resp. embed) the most general class of (torsional) Galilean (resp. Carrollian) connections.