English

Integration of twisted Dirac brackets

Differential Geometry 2009-12-04 v2 Mathematical Physics math.MP Symplectic Geometry

Abstract

The correspondence between Poisson structures and symplectic groupoids, analogous to the one of Lie algebras and Lie groups, plays an important role in Poisson geometry; it offers, in particular, a unifying framework for the study of hamiltonian and Poisson actions. In this paper, we extend this correspondence to the context of Dirac structures twisted by a closed 3-form. More generally, given a Lie groupoid GG over a manifold MM, we show that multiplicative 2-forms on GG relatively closed with respect to a closed 3-form ϕ\phi on MM correspond to maps from the Lie algebroid of GG into the cotangent bundle TMT^*M of MM, satisfying an algebraic condition and a differential condition with respect to the ϕ\phi-twisted Courant bracket. This correspondence describes, as a special case, the global objects associated to twisted Dirac structures. As applications, we relate our results to equivariant cohomology and foliation theory, and we give a new description of quasi-hamiltonian spaces and group-valued momentum maps.

Keywords

Cite

@article{arxiv.math/0303180,
  title  = {Integration of twisted Dirac brackets},
  author = {H. Bursztyn and M. Crainic and A. Weinstein and C. Zhu},
  journal= {arXiv preprint arXiv:math/0303180},
  year   = {2009}
}

Comments

42 pages. Minor changes, typos corrected. Revised version to appear in Duke Math. J