摘要
A study is made of the sampling-time effects of higher-order digitisations (i.e the Madwed and Boxer-Thaler digitisations) to convert a continuous-time system into a discrete time system. A general expression for the denominator and numerator of the digitised system is proposed, and used to predict precisely the computational stability and sampling-time effects of these types of digitisation. The polynomial root locus is introduced to described the pole variations of the digitised system is proposed and used to predict precisely the computational stability and sampling-time effects of these types of digitisation. The polynomial root locus is introduced to described the pole variations of the digitised system when the sampling time is varied from zero to infinity. The maximum sampling time of a particular digitisation can also be found by a new algorithm which is proposed. The transient behaviour of the digitised system is further studied by defining a new set of transient terms for discrete-time systems. In this way, the effects of sampling-time can be studied thoroughly. It is shown that the appropriate methods play a meaningful role in selecting appropriate sampling times for real problems. Several examples are illustrated.
原文 | 英語 |
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頁(從 - 到) | 83-92 |
頁數 | 10 |
期刊 | IEE Proceedings: Control Theory and Applications |
卷 | 141 |
發行號 | 2 |
DOIs | |
出版狀態 | 已發佈 - 1994 3月 |
對外發佈 | 是 |
ASJC Scopus subject areas
- 控制與系統工程
- 儀器
- 電氣與電子工程