OPTIMAL DESIGN OF MULTI-PARAMETER DYNAMIC SYSTEMS.
Abstract
Two design methods for multi-parameter dynamic systems are proposed. They are intended to eliminate the limitations and disadvantages of the existing design methods. The powerful mathematical tools of optimal control theory are applied to the practical design problems of classical control. The first method is intended for linear systems only; the design problem is solved in the s-domain, by finding 'the best root locations' of the system's characteristic equation. In the second method, the design problem is solved by finding 'the best response' of the system in the time domain. The second method is applicable to a wide range of dynamic systems; it can be used to synthesize linear, non-linear and sampled-data systems, and systems with time delay. This method is also extended to a numerical stability analysis procedure. Fourteen examples are presented to illustrate the applications of the methods. (Author)
Document Details
- Document Type
- Technical Report
- Publication Date
- Oct 01, 1969
- Accession Number
- AD0705092
Entities
People
- Erkal Tuzgiray
Organizations
- Naval Postgraduate School