Titlebook: Bifurcation Dynamics of a Damped Parametric Pendulum; Yu Guo,Albert C. J. Luo Book 2020 Springer Nature Switzerland AG 2020

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書(shū)目名稱Bifurcation Dynamics of a Damped Parametric Pendulum影響因子(影響力)

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Travelable Periodic Motions, the pendulum. Using such fictitious functions, we can easily observe the motion complexity of angular displacement, and the coefficient .>0 in the fictitious function is arbitrarily chosen. Without loss of generality, for the Fourier series of velocity, the symbols for harmonic amplitudes and phase

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2573-3168 . The non-travelable and travelable periodic motions on the bifurcation trees are discovered. Through the bifurcation trees of travelable and non-travelable per978-3-031-79644-9978-3-031-79645-6Series ISSN 2573-3168 Series E-ISSN 2573-3176

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https://doi.org/10.1007/978-94-009-3861-8non-polynomial dynamical systems. The parametric pendulum will be as an example to be investigated, and the corresponding methodology and results can help one understand motion complexity in nonlinear dynamical systems. A parametric pendulum system is very simple but it possesses rich and complicate

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Excitation Functions With Finite Rise Time,riodic motion can be expressed by discrete points through discrete mappings of continuous dynamical systems. The method is stated through the following theorem. From Luo [48], we have the following theorem.

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Diffus verteiltes interstellares Gas,arametrically excited pendulum. The stability and bifurcations of periodic motions are also illustrated through eigenvalue analysis. The solid and dashed curves represent the stable and unstable motions, respectively. The black and red colors are for paired asymmetric motions. The acronyms “SN” and

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