Bi-Para-Mechanical Systems on Lagrangian Distributions
Mehmet Tekkoyun, Murat Sari
TL;DR
This paper introduces bi-para-complex analogues of Lagrangian and Hamiltonian systems on Lagrangian distributions, exploring their geometric and physical properties within bi-para-dynamical frameworks.
Contribution
It presents the first formulation of bi-para-complex Lagrangian and Hamiltonian systems on Lagrangian distributions, expanding the geometric and physical understanding of bi-para-dynamical systems.
Findings
Development of bi-para-complex Lagrangian systems
Extension of Hamiltonian systems to bi-para context
Analysis of geometric and physical properties
Abstract
In this work, bi-para-complex analogue of Lagrangian and Hamiltonian systems was introduced on Lagrangian distributions. Yet, the geometric and physical results related to bi-para-dynamical systems were also presented.
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Taxonomy
TopicsDynamics and Control of Mechanical Systems · Control and Stability of Dynamical Systems · Elasticity and Wave Propagation