2 edition of survey of optimal control of distributed-parameter systems found in the catalog.
survey of optimal control of distributed-parameter systems
Battelle Memorial Institute. Columbus Laboratories.
1969 by distributed by National Technical Information Service in Springfield, Va .
Written in English
Bibliography: leaves 20-39.
|Statement||[prepared for the Battelle Memorial Institute by] Alfred C. Robinson.|
|Contributions||Robinson, Alfred C.|
|The Physical Object|
|Pagination||iv, 39 leaves ;|
|Number of Pages||39|
Feedback boundary stabilization of the two-dimensional Navier-Stokes equations. Control of a quantum particle in a moving potential well. Preliminary version. Richard S.
Masson, Paris, Subsequent chapters establish axioms for linear dynamic systems, linking the axiomatic description to the state space description. Duality methods Let us now introduce some " optimal control maps". The field has its origins in pursuit-evasion games in a military context, but now has a much more important role in Robust Controller Design. Exact controllability of semilinear abstract systems with application to waves and plates boundary control problems. Without these cookies, we can't provide services to you.
Control of a quantum particle in a moving potential well. Control and numerical approximation of the wave and heat equations. Longman Sci. Zuazua, C. Surveys, —, Alain Bensoussan.
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These include generalizations of the Pontryagin Maximum Principle, a rigorous framework for Dynamic Programming based on novel concepts of ''solution'' to the Hamilton Jacobi Equation, such as viscosity solutions, and new, unrestrictive, conditions for minimizer regularity. The manuscript investigates the semigroup approach to boundary value control and stability of nonlinear distributed parameter systems.
Exact controllability for semilinear wave equations in one space dimension. Notable features 1 A self-contained and accessible exposition of Nonsmooth Analysis and its applications to the analysis of minimizin g arcs.
Exact controllability and stabilization. Numerical methods Again, there are two possibilities to study numerically the controllability of a linear control system: direct methods, duality methods.
In this formulation, the optimization is performed with respect to all possible evolutions of the disturbance. ISBN X. Necessary conditions for optimality of odd order in a time-optimality problem for systems that are linear with respect to control.
Ray M. Differential Equations, 2 —, The real challenge is to devise a method, the complexity of which is considerably less than that of dynamic programming, for achieving feedback model predictive control of constrained dynamic systems that is robust to a wide class of uncertainties.
We also prove a general result that applies to partially distributed control and a variety of performance criteria, stating that optimal controllers inherit the spatial invariance structure of the plant. Here the state constraints are enlarged by a given margin so that a trajectory can be guaranteed to be found under any evolution of disturbance.
A, 1 —61, For precise informations and references, we refer to the survey papers Enrique Zuazua, ; Vilmos Komornik and Paola Loreti. Academic Press Inc. The first chapter contains a concentrated version of the authors' first volume. Abstract hyperbolic-like systems over a finite time horizon.
Hector O. Izhikevich Equilibrium. Recent advances are reported on the behavioral approach to systems, the relationship between differential games and robust control, estimation of diffusion processes, Markov processes, optimal control, hybrid control, stochastic control, spectral estimation, nonconvex quadratic programming, robust control, control algorithms and quantized linear systems.Feedback Optimal Control of Distributed Parameter Systems by Using Finite-Dimensional Approximation Schemes Article in IEEE Transactions on Neural Networks and Learning Systems 23(6) The following research topics are addressed: distributed parameter systems, stochastic control, filtering and estimation, optimization and optimal control, image processing and vision, hierarchical systems and hybrid control, nonlinear systems, and linear systems.
Services for this Book. Download Product Flyer Download High-Resolution Cover. This report is a survey of theoretical and computational methods in the field of optimal control of distributed-parameter systems. This includes systems described by integral equations and partial differential equations.
The various studies which have been done are Cited by: Control of Distributed Parameter Systems covers the proceeding of the Third International Federation of Automatic Control (IFAC) Symposium on Control of Distributed Parameter Systems.
The book reviews papers that tackle issues concerning the control of distributed parameter systems, such as modeling, identification, estimation.
Belmiloudi A () Robust and Optimal Control Problems to a Phase-Field Model for the Solidification of a Binary Alloy with a Constant Temperature, Journal of Dynamical and Control Systems,(), Online publication date: 1-Oct Online base book. Active Networks: IFIP TC6 6th International Working Conference, IWANLawrence, KS, USA, October, Revised Papers (Lecture Notes in Computer.