Geodesically reversible Finsler 2-spheres of constant curvature
| dc.contributor.author | Bryant, R | |
| dc.contributor.editor | Griffiths, Phillip A | |
| dc.date.accessioned | 2016-08-25T13:57:35Z | |
| dc.date.issued | 2006 | |
| dc.description.abstract | 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. | |
| dc.identifier.uri | ||
| dc.publisher | World Scientific Publishers | |
| dc.relation.ispartof | Inspired by S. S. Chern---A Memorial Volume in Honor of a Great Mathematician | |
| dc.relation.ispartof | Nankai Tracts in Mathematics | |
| dc.subject | Finsler | |
| dc.subject | constant curvature | |
| dc.title | Geodesically reversible Finsler 2-spheres of constant curvature | |
| dc.type | Book section | |
| duke.contributor.orcid | Bryant, R|0000-0002-4890-2471 | |
| pubs.begin-page | 95 | |
| pubs.end-page | 111 | |
| pubs.organisational-group | Duke | |
| pubs.organisational-group | Mathematics | |
| pubs.organisational-group | Trinity College of Arts & Sciences | |
| pubs.place-of-publication | Hackensack, NJ | |
| pubs.publication-status | Published | |
| pubs.volume | 11 |
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