Embedding equilibrium points in a nonlinear dynamics with adjustable operator

K. Masuda, E. Aiyoshi

Research output: Chapter in Book/Report/Conference proceedingConference contribution

Abstract

Analyses of nonlinear dynamical systems based on mathematical science have been studied actively, and the property of such systems are known to be characterized by the stability around their equilibrium points. In this paper, we propose a method to embed a new equilibrium point into the system by operating an nonlinearly adjustable matrix. The criteria and procedures to provide a suitable matrix and adjust it for effective engineering use are also discussed.

Original languageEnglish
Title of host publicationProceedings of the SICE Annual Conference
Pages1615-1620
Number of pages6
Publication statusPublished - 2005
EventSICE Annual Conference 2005 - Okayama, Japan
Duration: 2005 Aug 82005 Aug 10

Other

OtherSICE Annual Conference 2005
CountryJapan
CityOkayama
Period05/8/805/8/10

Fingerprint

Nonlinear dynamical systems

Keywords

  • Equilibrium point analysis
  • Nonlinear dynamical system
  • Variable metric

ASJC Scopus subject areas

  • Engineering(all)

Cite this

Masuda, K., & Aiyoshi, E. (2005). Embedding equilibrium points in a nonlinear dynamics with adjustable operator. In Proceedings of the SICE Annual Conference (pp. 1615-1620)

Embedding equilibrium points in a nonlinear dynamics with adjustable operator. / Masuda, K.; Aiyoshi, E.

Proceedings of the SICE Annual Conference. 2005. p. 1615-1620.

Research output: Chapter in Book/Report/Conference proceedingConference contribution

Masuda, K & Aiyoshi, E 2005, Embedding equilibrium points in a nonlinear dynamics with adjustable operator. in Proceedings of the SICE Annual Conference. pp. 1615-1620, SICE Annual Conference 2005, Okayama, Japan, 05/8/8.
Masuda K, Aiyoshi E. Embedding equilibrium points in a nonlinear dynamics with adjustable operator. In Proceedings of the SICE Annual Conference. 2005. p. 1615-1620
Masuda, K. ; Aiyoshi, E. / Embedding equilibrium points in a nonlinear dynamics with adjustable operator. Proceedings of the SICE Annual Conference. 2005. pp. 1615-1620
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