Publication detail

Modelling of electromechanical systems with Lagrange equations.

PROKOP, R. - KHATEB, A. - STEHLÍK, J.

Original Title

Modelling of electromechanical systems with Lagrange equations.

Czech Title

Modelování elektromechanických systémů Lagrangeovými rovnicemi.

English Title

Modelling of electromechanical systems with Lagrange equations.

Type

conference paper

Language

en

Original Abstract

With advanced computer-aided-design tools, one can design, analyze, and evaluate three-dimensional (3D) nanostructures in the steady - state. However, the comprehensive analysis in the time domain needs to be performed. That is, the designer must study the dynamic evolution of MEMS and NEMS. Lagrange equations of motion are used for this modelling.

Czech abstract

With advanced computer-aided-design tools, one can design, analyze, and evaluate three-dimensional (3D) nanostructures in the steady - state. However, the comprehensive analysis in the time domain needs to be performed. That is, the designer must study the dynamic evolution of MEMS and NEMS. Lagrange equations of motion are used for this modelling.

English abstract

With advanced computer-aided-design tools, one can design, analyze, and evaluate three-dimensional (3D) nanostructures in the steady - state. However, the comprehensive analysis in the time domain needs to be performed. That is, the designer must study the dynamic evolution of MEMS and NEMS. Lagrange equations of motion are used for this modelling.

Keywords

Modelling, Lagrange equations, MEMS, electromechanical systems

RIV year

2005

Released

23.09.2005

Publisher

Nakl. Novotný

Location

Brno

ISBN

80-214-3042-7

Book

Socrates Workshop 2005. Proceedings

Pages from

81

Pages to

91

Pages count

11

BibTex


@inproceedings{BUT20937,
  author="Roman {Prokop} and Fabian {Khateb} and Jiří {Stehlík}",
  title="Modelling of electromechanical systems with Lagrange equations.",
  annote="With advanced computer-aided-design tools, one can design, analyze, and evaluate three-dimensional (3D) nanostructures in the steady - state. However, the comprehensive analysis in the time domain needs to be performed. That is, the designer must study the dynamic evolution of MEMS and NEMS. Lagrange equations of motion are used for this modelling.",
  address="Nakl. Novotný",
  booktitle="Socrates Workshop 2005. Proceedings",
  chapter="20937",
  institution="Nakl. Novotný",
  year="2005",
  month="september",
  pages="81",
  publisher="Nakl. Novotný",
  type="conference paper"
}