The ladder of Finsler-type objects and their variational problems on spacetimes

Abstract

The space of anisotropic r-contravariant s-covariant α-homogeneous tensors on a manifold admits a functorial structure where vertical derivatives ∂ and contractions C by the Liouville vector field C are operators which maintain s+α constant. In (semi-)Finsler geometry, this structure is transmitted faithfully to connection-type elements yielding the following ladder: geodesic sprays / nonlinear connections / anisotropic connections / linear (Finslerian) connections. However, it is more loosely transmitted to metric-type ones: Finslerian Lagrangians / Legendre transformations / anisotropic metrics. We will study this structure in depth and apply it to discuss the recent variational proposals (Einstein-Hilbert, Einstein-Palatini, Einstein-Cartan) for generalizing Einstein equations to the Finsler setting.

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