Mathematics – Differential Geometry
Scientific paper
2002-08-05
Indagationes Math. (N. S.). 15, no. 3, (2004), 321-338
Mathematics
Differential Geometry
17 pages; no figures; Latex2e; the exposition has been improved and new results have been added; to appear in Indag. Math
Scientific paper
Let $(M,F)$ be a Finsler manifold. We construct a 1-cocycle on $\Diff(M)$ with values in the space of differential operators acting on sections of some bundles, by means of the Finsler function $F.$ As an operator, it has several expressions: in terms of the Chern, Berwald, Cartan or Hashiguchi connection, although its cohomology class does not depend on them. This cocycle is closely related to the conformal Schwarzian derivatives introduced in our previous work. The second main result of this paper is to discuss some properties of the conformally invariant quantization map by means of a Sazaki (type) metric on the slit bundle $TM\backslash 0$ induced by $F.$
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