Bifurcations

Chapter
Part of the Lecture Notes in Control and Information Sciences book series (LNCIS, volume 421)

Differential Equations and Dynamical Systems

Differential equation can be described as the following form:

\(\frac{\textrm{d}x}{\textrm{d}t}=\dot x=f(x), (3.1)\)

Keywords

Manifold Dition Librium Rium Guaran 

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References

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    Guckenheimer, J., Holmes, P.: Nonlinear Oscillations, Dynamical Systems and Bifurcations of Vector Field. Springer, New York (1983)Google Scholar
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    Hartman, P.: Ordinary Differential Equations. Cambridge University Press, Cambridge (2002)Google Scholar
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    Kielhoefer, H.: Bifurcation Theory: An Introduction with Applications to PDEs. Springer, New York (2004)Google Scholar
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    Kuznetsov, Y.: Elements of Applied Bifurcation Theory. Springer, New York (2004)Google Scholar
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    Ma, T., Wang, S.: Bifurcation Theory and Applications. World Scientific, Singapore (2005)Google Scholar
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    Parker, T.S., Chua, L.O.: Practical Numerical Algorithms for Chaotic Systems. Springer, New York (1989)Google Scholar
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    Seydel, R.: Practical Bifurcation and Stability Analysis. Springer, Berlin (2010)Google Scholar

Copyright information

© Springer-Verlag London Limited 2012

Authors and Affiliations

  1. 1.College of SciencesNortheastern UniversityShenyangChina, People’s Republic

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