English

Lie algebroid foliations and ${\cal E}^1(M)$-Dirac structures

Differential Geometry 2009-11-07 v1 Symplectic Geometry

Abstract

We prove some general results about the relation between the 1-cocycles of an arbitrary Lie algebroid AA over MM and the leaves of the Lie algebroid foliation on MM associated with AA. Using these results, we show that a E1(M){\cal E}^1(M)-Dirac structure LL induces on every leaf FF of its characteristic foliation a E1(F){\cal E}^1(F)-Dirac structure LFL_F, which comes from a precontact structure or from a locally conformal presymplectic structure on FF. In addition, we prove that a Dirac structure L~\tilde{L} on M×RM\times \R can be obtained from LL and we discuss the relation between the leaves of the characteristic foliations of LL and L~\tilde{L}.

Keywords

Cite

@article{arxiv.math/0106086,
  title  = {Lie algebroid foliations and ${\cal E}^1(M)$-Dirac structures},
  author = {D. Iglesias and J. C. Marrero},
  journal= {arXiv preprint arXiv:math/0106086},
  year   = {2009}
}

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25 pages