Email this article Lagrangian and Hamiltonian Duality
- Authors: Rossi O.1,2,3, Saunders D.2
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Affiliations:
- Department of Mathematics, Stockholm University
- Department of Mathematics, Faculty of Science, University of Ostrava
- Department of Mathematics and Statistics, La Trobe University
- Issue: Vol 218, No 6 (2016)
- Pages: 813-819
- Section: Article
- URL: https://ogarev-online.ru/1072-3374/article/view/238357
- DOI: https://doi.org/10.1007/s10958-016-3069-6
- ID: 238357
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Abstract
We propose a setting for De Donder–Hamilton field theory in jet bundles, generalizing the usual multisymplectic formalism. Using a reformulation of Hamilton theory for the family of local Lagrangians related to a global Euler–Lagrange form, we construct a dual Hamiltonian bundle and corresponding Legendre maps, linking a Lagrangian system on a jet bundle with a canonical Hamiltonian system on the affine dual. Our approach significantly extends the family of regular variational problems that can be treated directly within a dual Hamiltonian formalism, thus avoiding the necessity to use the Dirac constraint formalism.
About the authors
O. Rossi
Department of Mathematics, Stockholm University; Department of Mathematics, Faculty of Science, University of Ostrava; Department of Mathematics and Statistics, La Trobe University
Author for correspondence.
Email: olga.rossi@osu.cz
Sweden, Stockholm; Ostrava; Melbourne
D. Saunders
Department of Mathematics, Faculty of Science, University of Ostrava
Email: olga.rossi@osu.cz
Czech Republic, Ostrava
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