Robert L. Bryant
Published 2004-07-29, updated 2004-08-02Version 2
A Finsler space is said to be geodesically reversible if each oriented geodesic can be reparametrized as a geodesic with the reverse orientation. A reversible Finsler space is geodesically reversible, but the converse need not be true. In this note, building on recent work of LeBrun and Mason, it is shown that a geodesically reversible Finsler metric of constant flag curvature on the 2-sphere is necessarily projectively flat. As a corollary, using a previous result of the author, it is shown that a reversible Finsler metric of constant flag curvature on the 2-sphere is necessarily a Riemannian metric of constant Gauss curvature, thus settling a long-standing problem in Finsler geometry.
Comments: 11 pages, references added, some arguments improved and exposition rearranged
Journal: Inspired by S. S. Chern--A Memorial Volume in Honor of a Great Mathematician, Nankai Tracts in Mathematics, edited by P. A. Griffiths, vol. 11 (Winter, 2006), World Scientific
On Akbar-Zadeh's Theorem on a Finsler Space of Constant Curvature
Characterization of Finsler Spaces of Scalar Curvature
On Sprays of Scalar Curvature and Metrizability
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