Electromagnetism, Optics, Acoustics, Heat Transfer, Classical Mechanics, and Fluid Dynamics

Higher-order differential variational principle and differential equations of motion for mechanical systems in event space

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Published 10 August 2014 2014 Chinese Physical Society and IOP Publishing Ltd
, , Citation Zhang Xiang-Wu et al 2014 Chinese Phys. B 23 104501 DOI 10.1088/1674-1056/23/10/104501

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Author affiliations

1 School of Physics and Mechatronic Engineering, Xi'an University of Arts and Science, Xi'an 710065, China

2 School of Electronic Engineering, Xi'an University of Posts and Telecommunications, Xi'an 710121, China

Dates

  1. Received 13 February 2014
  2. Published
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1674-1056/23/10/104501

Abstract

In this paper we study the higher-order differential variational principle and differential equations of motion for mechanical systems in event space. Based on the higher-order d'Alembert principle of the system, the higher-order velocity energy and the higher-order acceleration energy of the system in event space are defined, the higher-order d'Alembert—Lagrange principle of the system in event space is established, and the parametric forms of Euler—Lagrange, Nielsen and Appell for this principle are given. Finally, the higher-order differential equations of motion for holonomic systems in event space are obtained.

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