Stochastic Bifurcations of a Fractional‐Order Vibro‐Impact System Driven by Additive and Multiplicative Gaussian White Noises

Yang, Yong-Ge; Sun, Yahui; Xu, Wei

doi:10.1155/2019/6737139

Cited by 8 publications

(2 citation statements)

References 41 publications

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“…PAV was first studied by Thiele (1895), and MAV was proposed by . It should be pointed out that calculating a winning k-committee with respect to the second group of rules is computaionally hard (Aziz et al, 2015;LeGrand, 2004;, standing in contrast to the polynomial-time solvability for many additive rules (Aziz et al, 2015;Yang and Wang, 2019). Now we introduce the class of Thiele's rules which contain AV, ABCCV, and PAV.…”

Section: Satisfaction Approval Voting (Sav)mentioning

confidence: 99%

Complexity of Manipulating and Controlling Approval-Based Multiwinner Voting

Yang

2019

Proceedings of the Twenty-Eighth International Joint Conference on Artificial Intelligence

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Section: Satisfaction Approval Voting (Sav)mentioning

confidence: 99%

Complexity of Manipulating and Controlling Approval-Based Multiwinner Voting

Yang

2019

Proceedings of the Twenty-Eighth International Joint Conference on Artificial Intelligence

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“…Chen et al (2016) established a fractional-order model of magnetorheological damper. For more than 300 years, many scholars have systematically studied the properties and characteristics of fractional calculus and made considerable progress in basic theory (Gao and Sun, 2016; Laue, 1980; Petras, 2011; Sun and Yang, 2020; Yang, 2019; Yang and Shen, 2009; Yang et al, 2019). It provides a theoretical basis for the establishment and analysis of fractional-order model of viscoelastic materials.…”

Section: Introductionmentioning

confidence: 99%

Dynamic analysis and vibration control of two-degree-of-freedom boring bar with fractional-order model of magnetorheological fluid

Hou

Niu

Shen

et al. 2021

Journal of Vibration and Control

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The dynamic analysis and vibration control of a kind of damping boring bar system with magnetorheological fluid absorber are studied. A two-degree-of-freedom dynamic model of boring bar with magnetorheological fluid dynamic vibration absorber is established, in which the magnetorheological fluid damper adopts the fractional-order Bingham model. The forced vibration of the system is studied, and the approximate analytical solution is obtained by the averaging method. By comparing the analytical solution with the numerical solution, the accuracy of the analytical solution is proved by their high degree of fit. And the parameters of boring bar system are optimized by using the analytical solution. To reduce the amplitude of the system, a semi-active control strategy of modified relative velocity method is used to suppress the resonance response of the boring bar. Under the semi-active relative velocity control, the approximate analytical solution of the system is also obtained by means of averaging method. The stability of the system under semi-active control is analyzed by using the Lyapunov method. Compared with passive control, the semi-active relative velocity control has a very great effect on the vibration amplitude suppression. The results can provide a reference for the study of dynamics and vibration control of the systems with magnetorheological fluid control.

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Pattern control of external electromagnetic stimulation to neuronal networks

et al. 2020

Nonlinear Dyn

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Stochastic Bifurcations of a Fractional‐Order Vibro‐Impact System Driven by Additive and Multiplicative Gaussian White Noises

Cited by 8 publications

References 41 publications

Complexity of Manipulating and Controlling Approval-Based Multiwinner Voting

Complexity of Manipulating and Controlling Approval-Based Multiwinner Voting

Dynamic analysis and vibration control of two-degree-of-freedom boring bar with fractional-order model of magnetorheological fluid

Pattern control of external electromagnetic stimulation to neuronal networks

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