Stochastic characterization of harmonic sections and a Liouville theorem

Details Stochastic characterization of harmonic sections and a Liouville theorem Stochastic characterization of harmonic sections and a Liouville theorem

2009-12-15

arxiv.org/abs/0912.2895v2

Mathematics

Differential Geometry

19 pages

Scientific paper

Let $P(M,G)$ be a principal fiber bundle and $E(M,N,G,P)$ be an associate fiber bundle. Our interested is to study harmonic sections of the projection $\pi_{E}$ of $E$ into $M$. Our first purpose is to give a stochastic characterization of harmonic section from $M$ into $E$ and a geometric characterization of harmonic sections with respect to its equivariant lift. The second purpose is to show a version of Liouville theorem for harmonic sections and to prove that section $M$ into $E$ is a harmonic section if and only if it is parallel.

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