Multiplicative forms on Poisson groupoids
Abstract
Given a Lie groupoid over , the tangent Lie algebroid of , and the anchor map, we provide a formula that decomposes an arbitrary multiplicative -form on into two parts. The first part is , a -cocycle of valued in , and the second part is which is -compatible, meaning that for all . We call this pair of data the -characteristic pair of . Next, we prove that if is a Poisson Lie groupoid, then the space of multiplicative forms on has a differential graded Lie algebra (DGLA) structure. Furthermore, when combined with , which is the space of forms on the base manifold , forms a canonical DGLA crossed module. This supplements a previously known fact that multiplicative multivector fields on form a DGLA crossed module with the Schouten algebra stemming from the tangent Lie algebroid .
Keywords
Cite
@article{arxiv.2201.06242,
title = {Multiplicative forms on Poisson groupoids},
author = {Zhuo Chen and Honglei Lang and Zhangju Liu},
journal= {arXiv preprint arXiv:2201.06242},
year = {2023}
}
Comments
Comments are welcome. We clarified that Theorem 4.5 had already been discovered before in this version