NationMaster - Encyclopedia: Finsler metric

In mathematics, a Finsler manifold is a differential manifold M with a Banach norm defined over each tangent space such that the Banach norm as a function of position is smooth and satisfies the following property:

For each point x of M, and for every vector v in the tangent space T_xM, the second derivative of the function L:T_xM->R given by

at v is positive definite.

Riemannian manifolds (but not pseudo Riemannian manifolds) are special cases of Finsler manifolds.

The length of γ, a differentiable curve in M is given by

Note that this is reparametrization-invariant. Geodesics are curves in M whose length is extremal under functional derivatives.

Categories: Differential geometry | Metric geometry | Math stubs

Results from FactBites:

Title and Abstract (0 words)
	The Douglas curvature D of Finsler metrics is an important non-Riemannian projective invariant constructed from the Berwald curvature.
	A Finsler metric is called a Douglas metric if its Douglas curvature D. The Douglas metrics are more generalized ones than Berwald metrics and the class of Douglas metrics is much larger than that of Berwald metrics.
	We consider Finsler spaces with a Randers metric $ F = \alpha + \beta $, on the three dimensional real vector space, where $\alpha$ is the Euclidean metric and $\beta$ is a 1-form with norm $b,\,\,0\leq b<1$.

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