Rolling manifolds on space forms

Chitour, Yacine; Kokkonen, Petri

doi:10.1016/j.anihpc.2012.05.005

Chitour, Yacine ; Kokkonen, Petri

Annales de l'I.H.P. Analyse non linéaire, Tome 29 (2012) no. 6, pp. 927-954.

Résumé

In this paper, we consider the rolling problem (R) without spinning nor slipping of a smooth connected oriented complete Riemannian manifold $(M, g)$ onto a space form $(\hat{M}, \hat{g})$ of the same dimension $n ⩾ 2$ . This amounts to study an n-dimensional distribution $𝒟_{R}$ , that we call the rolling distribution, and which is defined in terms of the Levi-Civita connections $\nabla^{g}$ and $\nabla^{\hat{g}}$ . We then address the issue of the complete controllability of the control system associated to $𝒟_{R}$ . The key remark is that the state space Q carries the structure of a principal bundle compatible with $𝒟_{R}$ . It implies that the orbits obtained by rolling along loops of $(M, g)$ become Lie subgroups of the structure group of $π_{Q, M}$ . Moreover, these orbits can be realized as holonomy groups of either certain vector bundle connections $\nabla^{𝖱𝗈𝗅}$ , called the rolling connections, when the curvature of the space form is non-zero, or of an affine connection (in the sense of Kobayashi and Nomizu, 1996 [14]) in the zero curvature case. As a consequence, we prove that the rolling (R) onto an Euclidean space is completely controllable if and only if the holonomy group of $(M, g)$ is equal to $SO (n)$ . Moreover, when $(\hat{M}, \hat{g})$ has positive (constant) curvature we prove that, if the action of the holonomy group of $\nabla^{𝖱𝗈𝗅}$ is not transitive, then $(M, g)$ admits $(\hat{M}, \hat{g})$ as its universal covering. In addition, we show that, for n even and $n ⩾ 16$ , the rolling problem (R) of $(M, g)$ against the space form $(\hat{M}, \hat{g})$ of positive curvature $c > 0$ , is completely controllable if and only if $(M, g)$ is not of constant curvature c.

MR Zbl

DOI : 10.1016/j.anihpc.2012.05.005

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     author = {Chitour, Yacine and Kokkonen, Petri},
     title = {Rolling manifolds on space forms},
     journal = {Annales de l'I.H.P. Analyse non lin\'eaire},
     pages = {927--954},
     publisher = {Elsevier},
     volume = {29},
     number = {6},
     year = {2012},
     doi = {10.1016/j.anihpc.2012.05.005},
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     zbl = {1321.53021},
     language = {en},
     url = {http://www.numdam.org/articles/10.1016/j.anihpc.2012.05.005/}
}

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Chitour, Yacine; Kokkonen, Petri. Rolling manifolds on space forms. Annales de l'I.H.P. Analyse non linéaire, Tome 29 (2012) no. 6, pp. 927-954. doi : 10.1016/j.anihpc.2012.05.005. http://www.numdam.org/articles/10.1016/j.anihpc.2012.05.005/

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