Optimal control strategies for stochastically excited quasi partially integrable Hamiltonian systems

Huan, Ronghua; Deng, Mao Lin; Zhu, Wei

doi:10.1007/s10409-007-0079-0

Cited by 4 publications

(4 citation statements)

References 27 publications

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“…Since the DFIG model has coupled nonlinear factors, it is more difficult to analyze the model directly with the help of SDE theory. However, as shown in Equation (), in the neighborhood of the Hopf bifurcation point of DFIG, it can be regarded as a proposed Hamiltonian system 30,31 . Therefore, in the neighborhood of the equilibrium point, the linearized exact solution of the equation of A ( t ) can be obtained by applying the theory of the linear stochastic differential equation, as shown in Equation ().…”

Section: Analysis Of the Stochastic Stability And Bifurcation Behavio...mentioning

confidence: 99%

The stochastic stability and H_∞‐fuzzy control of stochastic bifurcation of a doubly‐fed induction generator

Chen,

Li,

Wei

et al. 2023

Energy Science & Engineering

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Considering the dynamic behavior of doubly‐fed induction generators (DFIGs) under the influence of random factors, this paper not only analyzes the phenomenon of stochastic instability and bifurcation of a DFIG dynamic variable in its random space when they are affected by environmental noise, but also proposes a method based on the Tkagi–Sugneo (T–S) fuzzy control strategy to control its stochastic bifurcation. First, a four‐dimensional stochastic dynamic DFIG model is established by using multiplicative white noise to simulate the influence of environmental noise on electrical variables, and stochastic central manifold theory is used to reduce the dimensionality of a planar model in the bifurcation neighborhood. Then, the stochastic stability of the model is investigated based on singular boundary theory, while the steady‐state probability density of the stochastic DFIG is determined using the Fokker–Plank–Kolmogorov equation to obtain the location and probability density of its stochastic P‐bifurcation. Finally, the influence of stochastic bifurcation behavior is eliminated by H∞‐fuzzy output feedback control. The numerical simulation results indicate that the location and probability of stochastic bifurcation in a DFIG will vary with the change in noise intensity, and the bifurcation parameter values and stochastic stability domain are obtained. The harm caused by random factors can be solved based on H∞‐fuzzy output feedback, which provides a theoretical basis for the stable operation of the DFIG system.

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Section: Analysis Of the Stochastic Stability And Bifurcation Behavio...mentioning

confidence: 99%

The stochastic stability and H_∞‐fuzzy control of stochastic bifurcation of a doubly‐fed induction generator

Chen,

Li,

Wei

et al. 2023

Energy Science & Engineering

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“…Recently, the proposed nonlinear stochastic optimal control strategy has been applied to stabilizing quasi integrable Hamiltonian systems [13], minimizing first-passage failure of quasi non-integrable and quasi partially integrable Hamiltonian systems [14,15] and minimizing the response of quasi non-integrable [16], quasi integrable [17] and quasi partially-integrable Hamiltonian systems [18]. In the present paper, the strategy is further extended to minimizing the first-passage failure of quasi integrable Hamiltonian systems.…”

Section: Introductionmentioning

confidence: 97%

Feedback minimization of first-passage failure of quasi integrable Hamiltonian systems

Deng

Zhu

2007

Acta Mech Sin

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A nonlinear stochastic optimal control strategy for minimizing the first-passage failure of quasi integrable Hamiltonian systems (multi-degree-of-freedom integrable Hamiltonian systems subject to light dampings and weakly random excitations) is proposed. The equations of motion for a controlled quasi integrable Hamiltonian system are reduced to a set of averaged Itô stochastic differential equations by using the stochastic averaging method. Then, the dynamical programming equations and their associated boundary and final time conditions for the control problems of maximization of reliability and mean first-passage time are formulated. The optimal control law is derived from the dynamical programming equations and the control constraints. The final dynamical programming equations for these control problems are determined and their relationships to the backward Kolmogorov equation governing the conditional reliability function and the Pontryagin equation governing the mean first-passage time are separately established. The conditional reliability function and the mean first-passage time of the controlled system are obtained by solving the final dynamical programming equations or their equivalent Kolmogorov and Pontryagin equations. An example is presented to illustrate the application and effectiveness of the proposed control strategy.

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“…In engineering field, however, only the linear quadratic Gaussian control strategy has been widely used. In the last few years, a nonlinear stochastic optimal control strategy has been proposed for the control of structural systems under random excitations [3][4][5][6]. Generally, the random excitation of the building structures is a non-stationary process and unpredictable.…”

Section: Introductionmentioning

confidence: 99%

Instantaneous Stochastic Optimal Control of Seismically Excited Structures Based on Time Domain Explicit Method

Zhang³

et al. 2013

AMR

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A new instantaneous stochastic optimal control (ISO) for the linear building structures subjected to non-stationary random excitations is proposed. A plane shear structure is taken as the example to illustrate the proposed method. The main advantage of the method is that the control force is easy to be calculated because the expression of the control force is independent of the state of the system.

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Optimal control strategies for stochastically excited quasi partially integrable Hamiltonian systems

Cited by 4 publications

References 27 publications

The stochastic stability and H_∞‐fuzzy control of stochastic bifurcation of a doubly‐fed induction generator

The stochastic stability and H_∞‐fuzzy control of stochastic bifurcation of a doubly‐fed induction generator

Feedback minimization of first-passage failure of quasi integrable Hamiltonian systems

Instantaneous Stochastic Optimal Control of Seismically Excited Structures Based on Time Domain Explicit Method

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Optimal control strategies for stochastically excited quasi partially integrable Hamiltonian systems

Cited by 4 publications

References 27 publications

The stochastic stability and H∞‐fuzzy control of stochastic bifurcation of a doubly‐fed induction generator

The stochastic stability and H∞‐fuzzy control of stochastic bifurcation of a doubly‐fed induction generator

Feedback minimization of first-passage failure of quasi integrable Hamiltonian systems

Instantaneous Stochastic Optimal Control of Seismically Excited Structures Based on Time Domain Explicit Method

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The stochastic stability and H_∞‐fuzzy control of stochastic bifurcation of a doubly‐fed induction generator

The stochastic stability and H_∞‐fuzzy control of stochastic bifurcation of a doubly‐fed induction generator