English

Efficient construction of contact coordinates for partial prolongations

Differential Geometry 2007-05-23 v2

Abstract

Let \CV\CV be a vector field distribution on manifold MM. We give an efficient algorithm for the construction of local coordinates on MM such that \CV\CV may be locally expressed as some partial prolongation of the contact distribution \CalCq(1)\Cal C^{(1)}_q, on the first order jet bundle of maps from R\Bbb R to Rq\Bbb R^q, q1q\geq 1. It is proven that if \CV\CV is locally equivalent to a partial prolongation of \CalCq(1)\Cal C^{(1)}_q then the explicit construction of contact coordinates algorithmically depends upon the determination of certain first integrals in a sequence of geometrically defined and algorithmically determined integrable Pfaffian systems on MM. The number of these first integrals that must be computed satisfies a natural minimality criterion. These results therefore provide a full and constructive generalisation of the classical Goursat normal form from the theory of exterior differential systems.

Cite

@article{arxiv.math/0406234,
  title  = {Efficient construction of contact coordinates for partial prolongations},
  author = {Peter J. Vassiliou},
  journal= {arXiv preprint arXiv:math/0406234},
  year   = {2007}
}

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23 pages