Conserved quantities on multisymplectic manifolds
Abstract
Given a vector field on a manifold M, we define a globally conserved quantity to be a differential form whose Lie derivative is exact. Integrals of conserved quantities over suitable submanifolds are constant under time evolution, the Kelvin circulation theorem being a well-known special case. More generally, conserved quantities are well-behaved under transgression to spaces of maps into M. We focus on the case of multisymplectic manifolds and Hamiltonian vector fields. We show that in the presence of a Lie group of symmetries admitting a homotopy co-momentum map, one obtains a whole family of globally conserved quantities. This extends a classical result in symplectic geometry. We carry this out in a general setting, considering several variants of the notion of globally conserved quantity.
Cite
@article{arxiv.1610.05592,
title = {Conserved quantities on multisymplectic manifolds},
author = {Leonid Ryvkin and Tilmann Wurzbacher and Marco Zambon},
journal= {arXiv preprint arXiv:1610.05592},
year = {2020}
}
Comments
24 pages