Marco Zambon, Chenchang Zhu
Published 2012-02-07Version 1
It is well-known that a Lie algebroid A is equivalently described by a degree 1 Q-manifold M. We study distributions on M, giving a characterization in terms of A. We show that involutive Q-invariant distributions on M correspond bijectively to IM-foliations on A (the infinitesimal version of Mackenzie's ideal systems). We perform reduction by such distributions, and investigate how they arise from non-strict actions of strict Lie 2-algebras on M.
Comments: Our previous submission arXiv:1012.0428v1 has been divided into two papers. The present paper contains sections 1.3 and 4 (improved in their presentation), and additionally addresses the link to IM-foliations. 19 pages
Journal: J. Geometric Mechanics, Volume 4, Number 4 (2012), pp. 469-485
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Dirac pairs
On Nash resolution of (singular) Lie algebroids
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