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Identifying Berwald Finsler geometries

Christian Pfeifer, Sjors Heefer, A. Fuster

2021Differential Geometry and its Applications11 citationsDOIOpen Access PDF

Abstract

Berwald geometries are Finsler geometries close to (pseudo)-Riemannian geometries. We establish a simple first order partial differential equation as necessary and sufficient condition, which a given Finsler Lagrangian has to satisfy to be of Berwald type. Applied to (α,β)-Finsler spaces or spacetimes, respectively, this reduces to a necessary and sufficient condition for the Levi-Civita covariant derivative of the geometry defining 1-form. We illustrate our results with novel examples of (α,β)-Berwald geometries which represent Finslerian versions of Kundt (constant scalar invariant) spacetimes. The results generalize earlier findings by Tavakol and van den Bergh, as well as the Berwald conditions for Randers and m-Kropina resp. very special/general relativity geometries.

Topics & Concepts

MathematicsFinsler manifoldCovariant transformationScalar (mathematics)Mathematical analysisDifferential geometryInvariant (physics)LagrangianMathematical physicsPure mathematicsGeometryScalar curvatureCurvatureAdvanced Differential Geometry Research