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Sub-Riemannian structures corresponding to Kählerian metrics on the universal Teichmueller space and curve

We consider the group of sense-preserving diffeomorphisms $\Diff S^1$ of the unit circle and its central extension, the Virasoro-Bott group, with their respective horizontal distributions chosen to be Ehresmann connections with respect to a projection to the smooth universal Teichmüller space and the universal Teichmüller curve associated to the space of normalized univalent functions. We find formulas for the normal geodesics with respect to the pullback of the invariant Kählerian metrics, namely, the Velling-Kirillov metric on the class of normalized univalent functions and the Weil-Petersson metric on the universal Teichmüller space. The geodesic equations are sub-Riemannian analogues of the Euler-Arnold equation and lead to the CLM, KdV, and other known non-linear PDE.

preprint2012arXivOpen access
Erlend GrongIrina MarkinaAlexander Vasil'ev
math.APmath.DG
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Erlend GrongIrina MarkinaAlexander Vasil'ev

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