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Huijgens’ Synchronization : A Challenge. / Kuznetsov, N. V.; Leonov, G. A.

Dynamics and Control of Hybrid Mechanical Systems. WORLD SCIENTIFIC PUBL CO PTE LTD, 2010. p. 7-28.

Research output: Chapter in Book/Report/Conference proceedingChapterResearchpeer-review

Harvard

Kuznetsov, NV & Leonov, GA 2010, Huijgens’ Synchronization: A Challenge. in Dynamics and Control of Hybrid Mechanical Systems. WORLD SCIENTIFIC PUBL CO PTE LTD, pp. 7-28.

APA

Kuznetsov, N. V., & Leonov, G. A. (2010). Huijgens’ Synchronization: A Challenge. In Dynamics and Control of Hybrid Mechanical Systems (pp. 7-28). WORLD SCIENTIFIC PUBL CO PTE LTD.

Vancouver

Kuznetsov NV, Leonov GA. Huijgens’ Synchronization: A Challenge. In Dynamics and Control of Hybrid Mechanical Systems. WORLD SCIENTIFIC PUBL CO PTE LTD. 2010. p. 7-28

Author

Kuznetsov, N. V. ; Leonov, G. A. / Huijgens’ Synchronization : A Challenge. Dynamics and Control of Hybrid Mechanical Systems. WORLD SCIENTIFIC PUBL CO PTE LTD, 2010. pp. 7-28

BibTeX

@inbook{c6c47e7b77b14147942303f5982f37c4,
title = "Huijgens{\textquoteright} Synchronization: A Challenge",
abstract = "This paper is devoted to the computation of Lyapunov quantities (Poincare-Lyapunov constants) and to the study of limit cycles of two-dimensional dynamical systems. Here new method for computation of Lyapunov quantities is suggested, which is based on the constructing approximations of solution in the original Euclidean coordinates and in the time domain. The advantages of this method are in its ideological simplicity and visualization power. This approach can also be applied to the problem of distinguishing of isochronous center. New method of asymptotic integration for Lienard equation is suggested which is effective for localization of attractors and investigation of large limit cycles. This technique is applied for investigation of autonomous quadratic systems. The quadratic system is reduced to the Lienard equation and then the two-dimensional domain of parameters, corresponding to the existence of four limit cycles (three small and one large), is evaluated. This domain extends the domain of parameters, obtained for quadratic system with four limit cycles by S.L. Shi in 1980.",
author = "Kuznetsov, {N. V.} and Leonov, {G. A.}",
note = "Publisher Copyright: {\textcopyright} 2010 by World Scientific Publishing Co. Pte. Ltd.",
year = "2010",
month = jan,
day = "1",
language = "English",
isbn = "9789814282314",
pages = "7--28",
booktitle = "Dynamics and Control of Hybrid Mechanical Systems",
publisher = "WORLD SCIENTIFIC PUBL CO PTE LTD",
address = "Singapore",

}

RIS

TY - CHAP

T1 - Huijgens’ Synchronization

T2 - A Challenge

AU - Kuznetsov, N. V.

AU - Leonov, G. A.

N1 - Publisher Copyright: © 2010 by World Scientific Publishing Co. Pte. Ltd.

PY - 2010/1/1

Y1 - 2010/1/1

N2 - This paper is devoted to the computation of Lyapunov quantities (Poincare-Lyapunov constants) and to the study of limit cycles of two-dimensional dynamical systems. Here new method for computation of Lyapunov quantities is suggested, which is based on the constructing approximations of solution in the original Euclidean coordinates and in the time domain. The advantages of this method are in its ideological simplicity and visualization power. This approach can also be applied to the problem of distinguishing of isochronous center. New method of asymptotic integration for Lienard equation is suggested which is effective for localization of attractors and investigation of large limit cycles. This technique is applied for investigation of autonomous quadratic systems. The quadratic system is reduced to the Lienard equation and then the two-dimensional domain of parameters, corresponding to the existence of four limit cycles (three small and one large), is evaluated. This domain extends the domain of parameters, obtained for quadratic system with four limit cycles by S.L. Shi in 1980.

AB - This paper is devoted to the computation of Lyapunov quantities (Poincare-Lyapunov constants) and to the study of limit cycles of two-dimensional dynamical systems. Here new method for computation of Lyapunov quantities is suggested, which is based on the constructing approximations of solution in the original Euclidean coordinates and in the time domain. The advantages of this method are in its ideological simplicity and visualization power. This approach can also be applied to the problem of distinguishing of isochronous center. New method of asymptotic integration for Lienard equation is suggested which is effective for localization of attractors and investigation of large limit cycles. This technique is applied for investigation of autonomous quadratic systems. The quadratic system is reduced to the Lienard equation and then the two-dimensional domain of parameters, corresponding to the existence of four limit cycles (three small and one large), is evaluated. This domain extends the domain of parameters, obtained for quadratic system with four limit cycles by S.L. Shi in 1980.

UR - http://www.scopus.com/inward/record.url?scp=85129092694&partnerID=8YFLogxK

M3 - Chapter

AN - SCOPUS:85129092694

SN - 9789814282314

SP - 7

EP - 28

BT - Dynamics and Control of Hybrid Mechanical Systems

PB - WORLD SCIENTIFIC PUBL CO PTE LTD

ER -

ID: 95231671