RT Journal Article
T1 Palatini gravity with nonmetricity, torsion, and boundaries in metric and connection variables
A1 Barbero G., J. Fernando
A1 Margalef Bentabol, Juan
A1 Varo, Valle
A1 Sánchez Villaseñor, Eduardo Jesús
AB We prove the equivalence in the covariant phase space of the metric and connection formulations for Palatini gravity, with nonmetricity and torsion, on a spacetime manifold with boundary. To this end, we will rely on the cohomological approach provided by the relative bicomplex framework. Finally, we discuss some of the physical implications derived from this equivalence in the context of singularity identification through curvature invariants.
PB American Physical Society
SN 2470-0010
YR 2021
FD 2021-08-15
LK https://hdl.handle.net/10016/33257
UL https://hdl.handle.net/10016/33257
LA eng
NO The authors are grateful to G. Olmo for helpful discussions. This work has been supported by the Spanish Ministerio de Ciencia Innovación y Universidades-Agencia Estatal de Investigación FIS2017-84440-C2-2-P grant. J. M. B. is supported by the Eberly Research Funds of Penn State, by the NSF Grant No. PHY-1806356 and by the Urania Stott fund of Pittsburgh foundation No. UN2017-92945. E. J. S. V. is supported by the Madrid Government (Comunidad de Madrid-Spain) under the Multiannual Agreement with UC3M in the line of Excellence of University Professors (EPUC3M23), and in the context of the V PRICIT (Regional Programme of Research and Technological Innovation).
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RD 4 jun. 2024