Bibliography: leaves 21-23.
|Statement||by C. Duncan MacRae|
|Series||M.I.T. Department of Economics. Working paper -- no. 20, Working paper (Massachusetts Institute of Technology. Dept. of Economics) -- no. 20.|
|The Physical Object|
|Pagination||, 23 leaves|
|Number of Pages||23|
A Dual Maximum Principle for Discrete-Time Lines Systems with Economic Applications Article (PDF Available) in IEEE Transactions on Automatic Control 14(1) - 52 Author: Cecil Duncan Macrae. As our title reveals, we focus on optimal control methods and applications relevant to linear dynamic economic systems in discrete-time variables. We deal only with discrete cases simply because economic data are available in discrete forms, hence realistic economic policies should be established in discrete-time : Springer-Verlag New York. In this article, two new comparison principles for studying positive invariance and stability of linear and nonlinear discrete-time systems are presen Cited by: 4. Discrete-Time Linear Systems: Theory and Design with Applications combines system theory and design in order to show the importance of system theory and its role in system book focuses on system theory (including optimal state feedback and optimal state estimation) and system design (with applications to feedback control systems and wireless transceivers, plus system .
The maximum principle (MP) for the discrete-time stochastic optimal control problems is proved. It is shown that the adjoint equations of the MP are a pair of backward stochastic difference equations. Let denote the set of natural numbers. Consider the discrete-time (DT) linear switched system (1) where, and is the switching law. This models a system that can switch between the linear subsystems: with the switching law determining which system is active at each time by: Previous duality theories for discrete-time linear systems over a field K have been restricted to cases in which the input, state, and output spaces are finite dimensional. Direct attempts to extend such a theory to infinite-dimensional systems fail, because the category K-LS of linear spaces over the field K is not self-dual and hence does not, by itself, provide an adequate Cited by: 5. Linear optimal estimation for discrete-time systems with measurement-delay and packet dropping. we study linear estimation for discrete time systems with measurement delay and packet dropping in this paper. M. JeonReceding horizon filtering for discrete-time linear systems with state and observation delays. IET Radar Sonar Navig., 6 (4 Cited by:
A second-order maximum principle for discrete-time bilinear control systems with applications to discrete-time linear switched systems Article in . Economic Dynamics in Discrete Time Jianjun Mia o/ The MIT Press Cambridge, Massachusetts Scalar Second-Order Linear Equations 8 First-Order Linear Systems 11 Nonsingular System 12 Singular System 17 Phase Diagrams 20 Nonlinear Systems 21 Maximum Principle Applications Secretary Problem File Size: KB. maximum production capacity of 30 tons per hour. The production at Site I produces tons of CO2 emissions per ton of cement produced while Site II produces only 1 ton of CO2 emissions per ton of cement produced. According to regulations the company is allowed to emit a maximum of 70 tons of CO2 emissions per Size: 8KB. Discrete-Time Linear Systems: Theory and Design with Applications combines system theory and design in order to show the importance of system theory and its role in system design. The book focuses on system theory (including optimal state feedback and optimal state estimation) and system design (with applications to feedback control systems and wireless Cited by: