English

Multiplicative forms on Poisson groupoids

Differential Geometry 2023-04-28 v2

Abstract

Given a Lie groupoid G\mathcal{G} over MM, AA the tangent Lie algebroid of G\mathcal{G}, and ρ:ATM\rho: A\rightarrow TM the anchor map, we provide a formula that decomposes an arbitrary multiplicative kk-form Θ\Theta on G\mathcal{G} into two parts. The first part is ee, a 11-cocycle of JG\mathfrak{J}\mathcal{G} valued in kTM\wedge^k T^*M, and the second part is θΓ(A(k1TM))\theta\in \Gamma(A^*\otimes (\wedge^{k-1} T^*M)) which is ρ\rho-compatible, meaning that ιρ(u)θ(u)=0\iota_{\rho(u)}\theta(u)=0 for all uAu\in A. We call this pair of data (e,θ)(e,\theta) the (0,k)(0,k)-characteristic pair of Θ\Theta. Next, we prove that if G\mathcal{G} is a Poisson Lie groupoid, then the space Ωmult(G)\Omega^{\bullet}_{\mathrm{mult}}(\mathcal{G}) of multiplicative forms on G\mathcal{G} has a differential graded Lie algebra (DGLA) structure. Furthermore, when combined with Ω(M)\Omega^\bullet(M), which is the space of forms on the base manifold MM, Ωmult(G)\Omega^{\bullet}_{\mathrm{mult}}(\mathcal{G}) forms a canonical DGLA crossed module. This supplements a previously known fact that multiplicative multivector fields on G\mathcal{G} form a DGLA crossed module with the Schouten algebra Γ(A)\Gamma(\wedge^\bullet A) stemming from the tangent Lie algebroid AA.

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

R2 v1 2026-06-24T08:51:59.712Z