$b$-Structures on Lie groups and Poisson reduction
Abstract
Motivated by the group of Galilean transformations and the subgroup of Galilean transformations which fix time zero, we introduce the notion of a -Lie group as a pair where is a Lie group and is a codimension-one Lie subgroup. Such a notion allows us to give a theoretical framework for transformations of space-time where the initial time can be seen as a boundary. In this theoretical framework, we develop the basics of the theory and study the associated canonical -symplectic structure on the -cotangent bundle together with its reduction theory. Namely, we extend the minimal coupling procedure to and prove that the Poisson reduction under the cotangent lifted action of by left translations can be described in terms of the Lie Poisson structure on (where is the Lie algebra of ) and the canonical -symplectic structure on , where is viewed as a one-dimensional -manifold having as critical hypersurface (in the sense of -manifolds) the identity element.
Keywords
Cite
@article{arxiv.2010.04770,
title = {$b$-Structures on Lie groups and Poisson reduction},
author = {Roisin Braddell and Anna Kiesenhofer and Eva Miranda},
journal= {arXiv preprint arXiv:2010.04770},
year = {2022}
}
Comments
this article has been completely rewritten; 11 pages, accepted for publication at Journal of Geometry and Physics. arXiv admin note: text overlap with arXiv:1811.11894