Average of geometric structures in Finsler spaces with Lorentzian signature

Abstract

Given the class of Finsler spaces with Lorentzian signature (M,L) on a manifold M endowed with a timelike vector field X satisfying g(x,y)(X,X)<0 at any point (x,y) of the slit tangent bundle, a pseudo-Riemannian metric defined on M of signature n-1 is associated to the fundamental tensor g. Furthermore, an affine, torsion free connection is associated to the Chern connection determined by L. The definition of the average connection does not make use of X. Therefore, there is no direct relation between these two averaged objects.