Convex functionals with good asymptotic behavior on a subset.
Convexity of the set of fixed points generated by some control systems.
Convolutional codes and frequency responses.
Cooperation of model predictive control with steady-state economic optimisation
Cooperative attitude control of multiple rigid bodies with multiple time-varying delays and dynamically changing topologies.
Cooperative control of active power filters in power systems without mutual communication.
Cooperative driving at isolated intersections based on the optimal minimization of the maximum exit time
Traditional traffic control systems based on traffic light have achieved a great success in reducing the average delay of vehicles or in improving the traffic capacity. The main idea of these systems is based on the optimization of the cycle time, the phase sequence, and the phase duration. The right-of-ways are assigned to vehicles of one or several movements for a specific time. With the emergence of cooperative driving, an innovative traffic control concept, Autonomous Intersection Management...
Cooperative-corrector multivariable fuzzy controller.
This paper deals with the decomposition problem of a multivariable fuzzy controller. For this purpose, the use of notions taken from the framework of the Game Theory is proposed. Using the notion of couple between variables, a partition of the rule space in subsystems is obtained. The subsystems are considered players that correct the actions of the others. These ideas are applied to the control of a polymerization reactor (CSTR).
Copula approach to residuals of regime-switching models
The autocorrelation function describing the linear dependence is not suitable for description of residual dependence of the regime-switching models. In this contribution, inspired by Rakonczai ([20]), we will model the residual dependence of the regime-switching models (SETAR, LSTAR and ESTAR) with the autocopulas (Archimedean, EV and their convex combinations) and construct improved quality models for the original real time series.
Correcteurs proportionnels-intégraux généralisés
Nous introduisons pour les systèmes linéaires constants les reconstructeurs intégraux et les correcteurs proportionnels-intégraux généralisés, qui permettent d’éviter le terme dérivé du PID classique et, plus généralement, les observateurs asymptotiques usuels. Notre approche, de nature essentiellement algébrique, fait appel à la théorie des modules et au calcul opérationnel de Mikusiński. Plusieurs exemples sont examinés.
Correcteurs proportionnels-intégraux généralisés
For constant linear systems we are introducing integral reconstructors and generalized proportional-integral controllers, which permit to bypass the derivative term in the classic PID controllers and more generally the usual asymptotic observers. Our approach, which is mainly of algebraic flavour, is based on the module-theoretic framework for linear systems and on operational calculus in Mikusiński's setting. Several examples are discussed.
Correction on “The properties of the Aumann integral with applications to differential inclusions and control systems”
Correction to “Partial exact controllability and exponential stability in higher-dimensional linear thermoelasticity”
Correction to "Partial Exact Controllability and Exponential Stability in Higher-Dimensional Linear Thermoeleasticity"
Correction to "Recursive self-tuning control of finite Markov chains" (Applicationes Math. 24 (2) (1996), 169-188
Correctness of a constrained control Mayer's problem for a class of singularly perturbed functional-differential systems
Corrigendum to: “On the circle criterion for boundary control systems in factor form: Lyapunov stability and Lur'e equations”
A corrected version of [P. Grabowski and F.M. Callier, ESAIM: COCV12 (2006) 169–197], Theorem 4.1, p. 186, and Example, is given.
Cost-efficient synthesis of multiprocessor heterogeneous systems
Couples de générateurs de certaines sous-algèbres de Lie de l'algèbre de Lie symplectique affine, et applications
Crop development model.