Abstract
The notion of a generalized CRF-structure on a smooth manifold was recently introduced and studied by Vaisman (2008) [6]. An important class of generalized CRF-structures on an odd dimensional manifold M consists of CRF-structures having complementary frames of the form ξ±η, where ξ is a vector field and η is a 1-form on M with η(ξ)=1. It turns out that these kinds of CRF-structures give rise to a special class of what we called strong generalized contact structures in Poon and Wade [5]. More precisely, we show that to any CRF-structures with complementary frames of the form ξ±η, there corresponds a canonical Lie bialgebroid. Finally, we explain the relationship between generalized contact structures and another generalization of the notion of a Cauchy-Riemann structure on a manifold.
| Translated title of the contribution | Lie bialgebroids of generalized CRF-manifolds |
|---|---|
| Original language | French |
| Pages (from-to) | 919-922 |
| Number of pages | 4 |
| Journal | Comptes Rendus Mathematique |
| Volume | 348 |
| Issue number | 15-16 |
| DOIs | |
| State | Published - Aug 2010 |
All Science Journal Classification (ASJC) codes
- Mathematics(all)