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Teleparallel equivalent of Gauss-Bonnet gravity and its modifications

Georgios KofinasResearch Group of Geometry, Dynamical Systems and Cosmology, Department of Information and Communication Systems Engineering, University of the Aegean, Karlovassi 83200, Samos, GreeceEmmanuel N. SaridakisInstituto de Física, Pontificia Universidad de Católica de Valparaíso, Casilla 4950 Valparaíso, Chile
2014en
ABI

Аннотация

Inspired by the teleparallel formulation of general relativity, whose Lagrangian is the torsion invariant $T$, we have constructed the teleparallel equivalent of Gauss-Bonnet gravity in arbitrary dimensions. Without imposing the Weitzenb\"ock connection, we have extracted the torsion invariant ${T}_{G}$, equivalent (up to boundary terms) to the Gauss-Bonnet term $G$. ${T}_{G}$ is constructed by the vielbein and the connection, it contains quartic powers of the torsion tensor, it is diffeomorphism and Lorentz invariant, and in four dimensions it reduces to a topological invariant as expected. Imposing the Weitzenb\"ock connection, ${T}_{G}$ depends only on the vielbein, and this allows us to consider a novel class of modified gravity theories based on $F(T,{T}_{G})$, which is not spanned by the class of $F(T)$ theories, nor by the $F(R,G)$ class of curvature modified gravity. Finally, varying the action we extract the equations of motion for $F(T,{T}_{G})$ gravity.

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