Advances in Theoretical and Mathematical Physics

Volume 26 (2022)

Number 10

The Einstein–Hilbert–Palatini formalism in pseudo-Finsler geometry

Pages: 3563 – 3631

DOI: https://dx.doi.org/10.4310/ATMP.2022.v26.n10.a5

Authors

Miguel Ángel Javaloyes (Departamento de Matemáticas, Universidad de Murcia, Spain)

Miguel Sánchez (Departamento de Geometría y Topología, Facultad de Ciencias & IMAG (Centro de Excelencia María de Maeztu), Universidad de Granada, Spain)

Fidel F. Villaseñor (Departamento de Geometría y Topología, Facultad de Ciencias & IMAG (Centro de Excelencia María de Maeztu), Universidad de Granada, Spain)

Abstract

A systematic development of the so-called Palatini formalism is carried out for pseudo-Finsler metrics $L$ of any signature. Substituting in the classical Einstein–Hilbert–Palatini functional the scalar curvature by the Finslerian Ricci scalar constructed with an independent nonlinear connection $N$, the affine and metric equations for $(N,L)$ are obtained. In Lorentzian signature with vanishing mean Landsberg tensor Lani, both the Finslerian Hilbert metric equation and the classical Palatini conclusions are recovered by means of a combination of techniques involving the (Riemannian) maximum principle and an original argument about divisibility and fiberwise analyticity. Some of these findings are also extended to classical Riemannian solutions by using the eigenvalues of a Laplacian. When $\operatorname{Lan}_i \neq 0$, the Palatini conclusions fail necessarily, however, a good number of properties of the solutions remain. The framework and proofs are built up in detail.

Published 25 March 2024