Titlebook: Bifurcation and Chaos in Engineering; Yushu Chen,Andrew Y. T. Leung Book 1998 Springer-Verlag London Limited 1998 Vibration.algorithms.cal

不成比例

https://doi.org/10.1007/978-981-10-1011-8mical behaviour of the semi-infinite time domain. The theory of the averaging method has various forms. When we describe the averaging method in the theory of bifurcation, we base our statements on the work of KBM and Hale (J.K. Hale) [30].

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rheumatology

https://doi.org/10.1007/978-1-4471-1575-5Vibration; algorithms; calculus; chaos; design; differential equation; dynamical systems; engineering desig

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978-1-4471-1577-9Springer-Verlag London Limited 1998

乏味

VOM PROBLEMBEZIRK ZUM KUNSTQUARTIER,In this chapter, section 5.1 studies another main method for the local bifurcation of dynamical systems: the Centre Manifold Theorem. In section 5.2, the centre manifold theorem is used to analyse simple bifurcation. In the section 5.3, the Normal Form theory of vector fields is introduced.

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anthropologist

Sharon Vaughn,Ruth McIntosh,Anne HoganWe include three computational methods in this chapter, namely normal form theory, symplectic integration and the imbedded partial differential equation method.

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Hopf Bifurcation,Periodic vibration phenomena can be found in many non-conservative systems in nature. Hopf bifurcation theory is a theory that studies the modern development of period vibration phenomena. In this chapter we introduce the method of studying the Hopf bifurcation of autonomous systems by the normal form theory.

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