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 LVY, the bundle of vertically adapted linear frames over the bundle of field configurations Y. Specifically, the generalized field momentum observables are vector-valued momentum mappings on the vertically adapted frame bundle generated from automorphisms of Y. The generalized symplectic geometry on LVY is a covering theory for multisymplectic geometry on the multiphase space Z, and it follows that the field momentum observables on Z are generalized by those on LVY. Furthermore, momentum observables on LVY produce conserved quantities along flows in LVY. 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.
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