Variations of arc length in Riemannian Finsler manifolds

To use the method of differential forms to describe the first variation, there is another approach which uses vector fields and covariant differentiation. First, in the finsler manifold, we shown that a piece wice variation t- curve and U-curve to gether with the vector fields T and U. We defined geodesic is the base curve ( ), in piece wise and to the describe second field satisfiy the Jacobi equation. In order to study simple Imagine a family of geodesic rays emanating from the point x. variation There fore, we will show that these geodesic rays will appear to bunch together , If the flag curvature is positive at x. Then, these geodesic rays will appear to disperse , if the flag curvature is negative at x. Conversly, in order to prove these statements, we must first make precise the meaning by bunching together and dispersing . As a conclusion, Goedesic and exponential map will be discussed. Actually, there are many variations on the theme we just described. Also, in this paper, we study of Jacobi fields and the Effect of curvature in Finsler manifolds.