On the generalized m-Kropina metrics
Abstract
Generalized m-Kropina metrics appear naturally as a spacetime geometry compatible with Lorentz symmetry breaking, leading to useful applications in modified gravity and cosmology. We prove that a generalized m-Kropina metric F is an almost rational Finsler metric. Thereby, we study the rationality of its Finslerian geometric objects in the directional variable y. For example, its geodesic spray coefficients are rational in y. Consequently, we prove that if F is an Einstein metric with m Z, then it is Ricci-flat. Moreover, for m ∈ 2 Z, if F has isotropic mean Berwald curvature, or has relatively isotropic Landsberg curvature, or has almost vanishing H-curvature, then F is weakly Berwaldian, or F is Landsbergian, or H=0, respectively. We, hence, deduce under what conditions a generalized m-Kropina metric F becomes an exact solution to either "Chen and Shen's Finslerian nonvcuum field equations"or "Pfeifer and Wohlfath's vacuum field equation". Finally, some examples of generalized m-Kropina metrics in dimension 4, which has significant applications in modified gravity and cosmology, are provided.
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