A Frame Bundle Generalization of Multisymplectic Momentum Mappings
Abstract
This paper presents generalized momentum mappings for covariant Hamiltonian field theories. The new momentum mappings arise from a generalization of symplectic geometry to , the bundle of vertically adapted linear frames over the bundle of field configurations . Specifically, the generalized field momentum observables are vector-valued momentum mappings on the vertically adapted frame bundle generated from automorphisms of . The generalized symplectic geometry on is a covering theory for multisymplectic geometry on the multiphase space , and it follows that the field momentum observables on are generalized by those on . Furthermore, momentum observables on produce conserved quantities along flows in . For translational and orthogonal symmetries of fields and reparametrization symmetry in mechanics, momentum is conserved, and for angular momentum in time-evolution mechanics we produce a version of the parallel axis theorem of rotational dynamics, and in special relativity, we produce the transformation of angular momentum under boosts.
Cite
@article{arxiv.math-ph/0111040,
title = {A Frame Bundle Generalization of Multisymplectic Momentum Mappings},
author = {J. K. Lawson},
journal= {arXiv preprint arXiv:math-ph/0111040},
year = {2015}
}
Comments
23 pages