Differential forms and odd symplectic geometry
Abstract
We recall the main facts about the odd Laplacian acting on half-densities on an odd symplectic manifold and discuss a homological interpretation for it suggested recently by P. {\v{S}}evera. We study the relationship of odd symplectic geometry with classical objects. We show that the Berezinian of a canonical transformation for an odd symplectic form is a polynomial in matrix entries and a complete square. This is a simple but fundamental fact, parallel to Liouville's theorem for an even symplectic structure. We draw attention to the fact that the de Rham complex on naturally admits an action of the supergroup of all canonical transformations of . The infinitesimal generators of this action turn out to be the classical `Lie derivatives of differential forms along multivector fields'.
Cite
@article{arxiv.math/0606560,
title = {Differential forms and odd symplectic geometry},
author = {Hovhannes M. Khudaverdian and Theodore Th. Voronov},
journal= {arXiv preprint arXiv:math/0606560},
year = {2019}
}
Comments
LaTeX, 14 pages. Minor editing