DocumentCode :
853776
Title :
On the "adiabatic approximation" for design of control laws for linear, time-varying systems
Author :
Friedland, Bernard ; Richman, Jack ; Williams, Douglas E.
Author_Institution :
Singer Company, Little Falls, NJ, USA
Volume :
32
Issue :
1
fYear :
1987
fDate :
1/1/1987 12:00:00 AM
Firstpage :
62
Lastpage :
63
Abstract :
Control laws are often designed for linear time-varying processes by solving the algebraic Riccati equation for the optimum control law at each instant of time. Such designs may be called "adiabatic approximations." Although they are not optimum, they can result in closed loop systems which perform well. The stability of systems designed using the adiabatic approximation can be assessed by the "second method of Lyapunov." Stability is assured if a readily computed test matrix 
, which depends on the rate of change of the parameters of the system, is negative-definite.
, which depends on the rate of change of the parameters of the system, is negative-definite.Keywords :
Algebraic Riccati equation (ARE); Linear systems, time-varying; Lyapunov methods, linear systems; Optimal control, linear systems; Riccati equations, algebraic; Time-varying systems, linear; Closed loop systems; Control systems; Differential equations; Military computing; Riccati equations; Stability; Steady-state; System testing; Thermodynamics; Time varying systems;
fLanguage :
English
Journal_Title :
Automatic Control, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9286
Type :
jour
DOI :
10.1109/TAC.1987.1104424
Filename :
1104424
Link To Document :
