Literatura académica sobre el tema "Parametrized LMIs"
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Artículos de revistas sobre el tema "Parametrized LMIs"
ICHIHARA, Hiroyuki, Eitaku NOBUYAMA y Takanori ISHII. "Relaxation Methods of Parametrized LMIs Based on D.C. and Multiconvex Technique". Transactions of the Institute of Systems, Control and Information Engineers 16, n.º 12 (2003): 649–54. http://dx.doi.org/10.5687/iscie.16.649.
Texto completoMahmoud, M. S., A. Ismail y F. M. Al-Sunni. "Parameterization approach to stability and feedback stabilization of linear time-delay systems". Proceedings of the Institution of Mechanical Engineers, Part I: Journal of Systems and Control Engineering 223, n.º 7 (9 de julio de 2009): 929–39. http://dx.doi.org/10.1243/09596518jsce802.
Texto completoCole, Matthew O. T., Theeraphong Wongratanaphisan y Patrick S. Keogh. "On LMI-Based Optimization of Vibration and Stability in Rotor System Design". Journal of Engineering for Gas Turbines and Power 128, n.º 3 (1 de marzo de 2004): 677–84. http://dx.doi.org/10.1115/1.2135818.
Texto completoKoeppel, Lisa, Sabine Dittrich, Sergio Brenner Miguel, Sergio Carmona, Stefano Ongarello, Beatrice Vetter, Jennifer Elizabeth Cohn, Till Baernighausen, Pascal Geldsetzer y Claudia M. Denkinger. "Addressing the diagnostic gap in hypertension through possible interventions and scale-up: A microsimulation study". PLOS Medicine 19, n.º 12 (6 de diciembre de 2022): e1004111. http://dx.doi.org/10.1371/journal.pmed.1004111.
Texto completoMahmoud, Magdi S. y Sami A. Elferik. "New Stabilization Schemes for Linear Hybrid Systems With Time-Varying Delays". Journal of Dynamic Systems, Measurement, and Control 132, n.º 5 (19 de agosto de 2010). http://dx.doi.org/10.1115/1.4002102.
Texto completoGratzer, Daniel, G. A. Kavvos, Andreas Nuyts y Lars Birkedal. "Multimodal Dependent Type Theory". Logical Methods in Computer Science Volume 17, Issue 3 (28 de julio de 2021). http://dx.doi.org/10.46298/lmcs-17(3:11)2021.
Texto completoTesis sobre el tema "Parametrized LMIs"
Bui-Tuan, Viet Long. "Stability and stabilization of linear parameter-varying and time-varying delay systems with actuators saturation". Electronic Thesis or Diss., Amiens, 2022. http://www.theses.fr/2022AMIE0082.
Texto completoThe dissertation is devoted to developing a methodology of stability and stabilization for the linear parameter-dependent (PD) and time-delay systems (TDSs) subject to control saturation. In the industrial process, control signal magnitude is usually bounded by the safety constraints, the physical cycle limits, and so on. For this reason, a suitable synthesis and analysis tool is needed to accurately describe the characteristics of the saturated linear parameter-varying (LPV) systems. In the part one, a parameter-dependent form of the generalized sector condition (GSC) is considered to solve the saturated stabilization problem. Several feedback control strategies are investigated to stabilize the saturated LPV/qLPV systems. Necessary and sufficient stabilization conditions via the parameterized linear matrix inequality (PLMI) formulation proposed for the feedback controllers conforming to the design requirements (i.e., the admissible set of the initial conditions, the estimated region of the asymptotic convergence domain, the robust stability and performance with the influence of perturbations, Etc.). The relaxation of the designed PLMIs is shown through the comparison results using a parameter-dependent Lyapunov function (PDLF). In the second part, the delay-dependent stability developments based on Lyapunov-Krasovskii functional (LKF) are presented. The modern advanced bounding techniques are utilized with a balance between conservatism and computational complexity. Then, saturation stabilization analyzes for the gain-scheduling controllers. Inspired by uncertain delay system methods, a novel stabilization condition is derived from the delay-dependent stabilizing analysis for the LPV time-delay system subject to saturation constraints. In this aspect, the stabilizing gain-scheduling feedback controllers improve the performance and stability of the saturated system and provide a large attraction domain. It can be emphasized that the derived formulation is general and can be used for the design control of many dynamic systems. Finally, to maximize the attraction region while guaranteeing the asymptotic stability of the closed-loop system, an optimization problem is included to the proposed control design strategy
Actas de conferencias sobre el tema "Parametrized LMIs"
A. de Mesquita, Vinícius, Jucelino Taleires Filho, Fabrício G. Nogueira y Bismark C. Torrico. "Controle LPV aplicado a uma máquina de relutância variável 6/4". En Congresso Brasileiro de Automática - 2020. sbabra, 2020. http://dx.doi.org/10.48011/asba.v2i1.1583.
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