DocumentCode
791368
Title
Investigation of worst-case errors when inputs and their rate of change are bounded
Author
Saridis, G. ; Rekasius, Z.V.
Author_Institution
Purdue University, Lafayette, IN, USA
Volume
11
Issue
2
fYear
1966
fDate
4/1/1966 12:00:00 AM
Firstpage
296
Lastpage
300
Abstract
The worst-case error analysis is extended to include the problem of bounded input 
and its rate of change 
for a a dynamical system described by a set of differential equations with separable forcing function. The problem is reformulated as a bounded-input, bounded-state variable problem, and Pontryagin\´s Maximum Principle is applied to maximize a given error function. For a wide class of systems, the time derivative of the worst forcing function is shown to be "bang-bang" for the open region defined by the constraint of and zero on its boundary. A computational algorithm is developed to solve the resulting two-point boundary value problem.
and its rate of change for a a dynamical system described by a set of differential equations with separable forcing function. The problem is reformulated as a bounded-input, bounded-state variable problem, and Pontryagin\´s Maximum Principle is applied to maximize a given error function. For a wide class of systems, the time derivative of the worst forcing function is shown to be "bang-bang" for the open region defined by the constraint of and zero on its boundary. A computational algorithm is developed to solve the resulting two-point boundary value problem.Keywords
Optimal control; Optimization methods; Control systems; Differential equations; Error analysis; Error correction; Information systems; Laboratories; Military computing; Missiles; Optimal control; Variable speed drives;
fLanguage
English
Journal_Title
Automatic Control, IEEE Transactions on
Publisher
ieee
ISSN
0018-9286
Type
jour
DOI
10.1109/TAC.1966.1098313
Filename
1098313
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