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31	Stochastic optimal estimation and control for discrete linear systems with multiple time delays El-Dahash, Abdulrahman Mohammed, 1943- January 1973 (has links) No description available. Mathematical optimization. Stochastic analysis. Discrete-time systems.
32	A mathematical approach to the abstract synthesis of sequential discrete systems. Jerome, Emile Julien January 1970 (has links) No description available. Sequential machine theory Discrete-time systems
33	The use of discrete event simulation techniques to optimize a proposed factory layout. Gokal, Manooj. 28 November 2013 (has links) This project has proved conclusively that discrete event simulation techniques can be used to simulate, on computer, a complex stochastic materials handling system. The packing, automatic palletising and warehousing departments of a large powders manufacturing factory was used as an example to investigate the capabilities of computer simulation. The company intends to increase the number of packing machines from seven to eleven, and has embarked on productivity improvement projects that aims to increase the average packing efficiency from the current 50%, to 60% with a long term goal of 70%. Due to the stochastic nature of the run and stop durations of the packing machines, it was impossible to predict the effect of the increased throughput on the palletising system by conventional means. The system was modelled on computer using the SIMAN simulation language. Extensive research was initially carried out in order to determine the operating parameters of the system. The generation of cases from the packing machines in the program was verified against actual production runs. Various alternatives were analyzed to assist in decision making on the expansion of the palletising system in order to accommodate the increased throughput expected from the packing floor. The simulation was therefore used to increase the capacity of the automatic palletising system at minimal cost while meeting demands from the packing floor. It was established that the only capital expenditure required would be about R500 000 to increase the capacity of a palletiser and to provide a pallet conveyor to transport 40% of the pallets to direct despatch. / Thesis (M.Eng.)-University of Durban-Westville, 1989. Discrete-Time Systems. Theses--Mechanical engineering.
34	Adaptive control of time-varying discrete-time systems Jerbi, Ali 05 1900 (has links) No description available. Discrete-time systems Adaptive control systems
35	Approximating discrete-time optimal control using a neural network Barth, Eric J. 12 1900 (has links) No description available. Discrete-time systems Neural networks (Computer science)
36	Approximating infinite horizon discrete-time optimal control using CMAC networks Barth, Eric J. 08 1900 (has links) No description available. System analysis Computer networks Discrete-time systems
37	Weighted balanced model reduction methods for 2-D discrete systems and related techniques Luo, Hong 06 May 2015 (has links) Graduate Discrete-time systems Algorithms Control theory
38	Simultaneous identification and control of discrete time single input single output systems Saratchandran, P. January 1978 (has links) This thesis is concerned with suboptimal adaptive control of discrete linear stochastic processes whose parameters are unknown. The suboptimal adaptive controllers considered are (i) Open Loop Feedback Optimal (OLFO) controller, (ii) self-tuning controller, and (iii) optimal k step ahead controller. Two more controllers, certainty about parameter (CAP) controller and no learning (NOL) controller, that provide bounds on the performance of these adaptive controllers are also considered. Performance of these controllers have been evaluated for a first order process through monte-carlo simulations. Simulation of OLFO controller together with the bounding controllers for the first order process when there is only one unknown parameter revealed that OLFO controller is unsuitable to control unstable processes and would be an unwise choice even for controlling stable processes. Selftuning and OK controllers have been simulated for the first order process with all the parameters unknown. Three cases for the unknown parameters have been considered. They are: (i) constant unknown parameters (ii) slowly time-varying unknown parameters and (iii) rapidly time-varying unknown parameters. Simulation results showed that in certain regions of the unknown parameter space the cost produced by self tuning controller and OK controller are very similar, in certain regions the OK controller produces lesser cost than the self-tuning controller and in certain other regions both controllers perform very badly. But self-tuning controller always took only half as much computing time as OK controller. A necessary condition for convergence of OK controller to a linear constant parameter controller having the same functional form as CAP controller is found out using the ideas of uniform complete observability. For a first order process under OK controller the only occasion the condition would be violated is when there is 'turn-off'. Finally, it is shown that using the combined state/parameter estimator in the place of extended Kalman filter the computational requirement of OK controller can be reduced. For the first order process, OK controller with the combined estimator took only sixty percent as much computing time as the OK controller with extended Kalman filter without any appreciable deterioration in the performance. 003.5
39	Stochastic bounded control for a class of discrete systems. Desjardins, Nicole. January 1971 (has links) No description available. Control theory Stochastic processes Discrete-time systems.
40	Just-in-time and just-in-place deadlock resolution Zeng, Fancong. January 2007 (has links) Thesis (Ph. D.)--Rutgers University, 2007. / "Graduate Program in Computer Science." Includes bibliographical references (p. 78-81).

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