Abstract
Abstract
A Lie system is a non-autonomous system of first-order ordinary differential equations describing the integral curves of a non-autonomous vector field taking values in a finite-dimensional real Lie algebra of vector fields, a so-called Vessiot–Guldberg Lie algebra. In this work, multisymplectic forms are applied to the study of the reduction of Lie systems through their Lie symmetries. By using a momentum map, we perform a reduction and reconstruction procedure of multisymplectic Lie systems, which allows us to solve the original problem by analysing several simpler multisymplectic Lie systems. Conversely, we study how reduced multisymplectic Lie systems allow us to retrieve the form of the multisymplectic Lie system that gave rise to them. Our results are illustrated with examples from physics, mathematics, and control theory.
Funder
Ministerio de Ciencia e Innovación
Narodowe Centrum Nauki
Subject
General Physics and Astronomy,Mathematical Physics,Modeling and Simulation,Statistics and Probability,Statistical and Nonlinear Physics
Cited by
3 articles.
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1. Reduction of $L_\infty$-Algebras of Observables on Multisymplectic Manifolds;Symmetry, Integrability and Geometry: Methods and Applications;2024-07-03
2. Poisson–Poincaré reduction for field theories;Journal of Geometry and Physics;2023-09
3. Contact Lie systems: theory and applications;Journal of Physics A: Mathematical and Theoretical;2023-07-28