Litcius/Paper detail

A New Approach in Analytical Dynamics of Mechanical Systems

Iuliu Negrean, Adina Veronica Crişan, Sorin Vlase

2020Symmetry32 citationsDOIOpen Access PDF

Abstract

This paper presents a new approach to the advanced dynamics of mechanical systems. It is known that in the movements corresponding to some mechanical systems (e.g., robots), accelerations of higher order are developed. Higher-order accelerations are an integral part of higher-order acceleration energies. Unlike other research papers devoted to these advanced notions, the main purpose of the paper is to present, in a matrix form, the defining expressions for the acceleration energies of a higher order. Following the differential principle in generalized form (a generalization of the Lagrange–D’Alembert principle), the equations of the dynamics of fast-moving systems include, instead of kinetic energies, the acceleration energies of higher-order. To establish the equations which characterize both the energies of accelerations and the advanced dynamics, the following input parameters are considered: matrix exponentials and higher-order differential matrices. An application of a 5 d.o.f robot structure is presented in the final part of the paper. This is used to illustrate the validity of the presented mathematical formulations.

Topics & Concepts

AccelerationMechanical systemGeneralizationDifferential equationMatrix (chemical analysis)Dynamics (music)Order (exchange)Equations of motionMatrix exponentialApplied mathematicsDifferential (mechanical device)Exponential functionComputer scienceMathematicsClassical mechanicsMathematical analysisPhysicsComposite materialArtificial intelligenceFinanceAcousticsMaterials scienceThermodynamicsEconomicsDynamics and Control of Mechanical SystemsExperimental and Theoretical Physics StudiesControl and Dynamics of Mobile Robots