Control strategies of an SIVS network model with two vaccinations     

《Journal of The Franklin Institute》2022,359(4):1724-1746

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Stochastic H2/H∞ control for discrete-time mean-field systems with Poisson jump     

Mengmeng Gao  Junsheng Zhao  Wei Sun 《Journal of The Franklin Institute》2021,358(6):2933-2947

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Stabilization of delayed neutral semi-Markovian jumping stochastic systems driven by fractional Brownian motions: H∞ control approach     

《Journal of The Franklin Institute》2023,360(12):7851-7877

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Virus infection model under nonlinear perturbation: Ergodic stationary distribution and extinction     

《Journal of The Franklin Institute》2022,359(18):11039-11067

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Weight splitting iteration methods to solve quadratic nonlinear matrix equation MY2+NY+P=0     

《Journal of The Franklin Institute》2023,360(3):1904-1928

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Global analysis of a vector-host epidemic model in stochastic environments     

Tao Feng  Zhipeng Qiu  Yi Song 《Journal of The Franklin Institute》2019,356(5):2885-2900

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Dynamic output feedback control for networked systems subject to communication delays,packet dropouts,and quantization     

Elahe Mastani  Mehdi Rahmani 《Journal of The Franklin Institute》2021,358(8):4303-4325

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Generalized conjugate direction algorithm for solving general coupled Sylvester matrix equations     

《Journal of The Franklin Institute》2023,360(14):10409-10432

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Observer design of descriptor nonlinear system with nonlinear outputs by using W1,2-optimality criterion     

Abdelghani Hamaz  Khadidja Chaib Draa  Fazia Bedouhene  Ali Zemouche  Rajesh Rajamani 《Journal of The Franklin Institute》2019,356(6):3531-3553

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Feedback Stackelberg strategies for the discrete-time mean-field stochastic systems in infinite horizon     

《Journal of The Franklin Institute》2019,356(10):5222-5239

This paper deals with the feedback Stackelberg strategies for the discrete-time mean-field stochastic systems in infinite horizon. The optimal control problem of the follower is first studied. Employing the discrete-time linear quadratic (LQ) mean-field stochastic optimal control theory, the sufficient conditions for the solvability of the optimization of the follower are presented and the optimal control is obtained based on the stabilizing solutions of two coupled generalized algebraic Riccati equations (GAREs). Then, the optimization of the leader is transformed into a constrained optimal control problem. Applying the Karush-Kuhn-Tucker (KKT) conditions, the necessary conditions for the existence and uniqueness of the Stackelberg strategies are derived and the Stackelberg strategies are expressed as linear feedback forms involving the state and its mean based on the solutions $(K_i,{\widehat{K}}_i),$ $i=1,2$ of a set of cross-coupled stochastic algebraic equations (CSAEs). An iterative algorithm is put forward to calculate efficiently the solutions of the CSAEs. Finally, an example is solved to show the effectiveness of the proposed algorithm.  相似文献   

Model predictive control under event-triggered communication scheme for nonlinear networked systems     

Qing Lu  Peng Shi  Jianxing Liu  Ligang Wu 《Journal of The Franklin Institute》2019,356(5):2625-2644

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Bifurcation of limit cycles from a switched equilibrium in planar switched systems     

《Journal of The Franklin Institute》2019,356(12):6419-6432

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Finite-time stability of singular time-delay systems based on a new weighted integral inequality     

《Journal of The Franklin Institute》2023,360(7):5092-5103

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The Gray image of a class of constacyclic codes over polynomial residue rings     

《Journal of The Franklin Institute》2014,351(12):5467-5479

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Aperiodic sampled-data robust H∞ control for delayed stochastic fuzzy systems with quasi-periodical multi-rate approach     

Shuqi Li  Feiqi Deng  Mali Xing 《Journal of The Franklin Institute》2019,356(8):4530-4553

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Nonlinear function activated GNN versus ZNN for online solution of general linear matrix equations     

《Journal of The Franklin Institute》2023,360(10):7021-7036

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Chaotic behavior of discrete-time linear inclusion dynamical systems     

Xiongping Dai  Tingwen Huang  Yu Huang  Yi Luo  Gang Wang  Mingqing Xiao 《Journal of The Franklin Institute》2017,354(10):4126-4155

Given any finite family of real d-by-d nonsingular matrices $\{S_1,\dots ,S_l\},$ by extending the well-known Li–Yorke chaos of a deterministic nonlinear dynamical system to a discrete-time linear inclusion or hybrid or switched system: we study the chaotic dynamics of the state trajectory (x_n(x₀, σ))_{n ≥ 1} with initial state $x_0\in {\mathbb{R}}^d,$ governed by a switching law $\sigma :\mathbb{N}\to \{1,\dots ,l\}$. Two sufficient conditions are given so that for a “large” set of switching laws σ, there exhibits the scrambled dynamics as follows: for all $x_0,y_0\in {\mathbb{R}}^d,x_0\ne y_0,$This implies that there coexist positive, zero and negative Lyapunov exponents and that the trajectories (x_n(x₀, σ))_{n ≥ 1} are extremely sensitive to the initial states $x_0\in {\mathbb{R}}^d$. We also show that a periodically stable linear inclusion system, which may be product unbounded, does not exhibit any such chaotic behavior. An explicit simple example shows the discontinuity of Lyapunov exponents with respect to the switching laws.  相似文献   

Optimal control problem for a general reaction–diffusion tumor–immune system with chemotherapy     

Feng Dai  Bin Liu 《Journal of The Franklin Institute》2021,358(1):448-473

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Control of homoclinic bifurcation in two-dimensional dynamical systems by a feedback law based on Lp spaces     

《Journal of The Franklin Institute》2022,359(10):5097-5124

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Finite-time contractive boundedness analysis and controller synthesis for interval positive linear systems under L1-gain performance     

《Journal of The Franklin Institute》2023,360(7):5001-5016

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