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Finsler 2-manifolds whose holonomy group is the diffeomorphism group of the circle

In this paper we show that the topological closure of the holonomy group of a certain class of projectively flat Finsler 2-manifolds of constant curvature is maximal, that is isomorphic to the connected component of the diffeomorphism group of the circle. This class of 2-manifolds contains the standard Funk plane of constant negative curvature and the Bryant-Shen-spheres of constant positive curvature. The result provides the first examples describing completely infinite dimensional Finslerian holonomy structures.

preprint2012arXivOpen access
Zoltan MuzsnayPeter T. Nagy
math.DG
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Zoltan MuzsnayPeter T. Nagy

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