Controllability of Discrete-Time Switched Fractional Order Systems

被引：0

作者：

Babiarz, Artur ^{[1
]}

Grzejszczak, Tomasz ^{[1
]}

Legowski, Adrian ^{[1
]}

Niezabitowski, Michal ^{[1
]}

机构：

[1] Silesian Univ Teclmol, Inst Automat Control, 16 Akad St, PL-44100 Gliwice, Poland

来源：

PROCEEDINGS OF THE 2016 12TH WORLD CONGRESS ON INTELLIGENT CONTROL AND AUTOMATION (WCICA) | 2016年

关键词：

DELAYS;

D O I：

暂无

中图分类号：

TP [自动化技术、计算机技术];

学科分类号：

0812 ;

摘要：

In the article unconstrained controllability problem of discrete-time switched fractional order systems is addressed. A solution of discrete-time switched fractional order state equation is presented. Additionally, a transition matrix of considered dynamical systems is given. A sufficient condition for unconstrained controllability in a given time interval is formulated and proved by the general formula of difference state equation solution. At the end, an illustrative example is also shown.

引用

页码：1754 / 1757

页数：4

共 50 条

[41] Reachability and controllability of discrete-time descriptor systems
Karampetakis, Nicholas P.
Gregoriadou, Anastasia
[J]. INTERNATIONAL JOURNAL OF CONTROL, 2014, 87 (02) : 235 - 248
[42] Approximate Controllability of Abstract Discrete-Time Systems
Hernán R. Henríquez
Claudio Cuevas
[J]. Advances in Difference Equations, 2010
[43] Asymptotic Controllability of Discrete-time Systems with Disturbances
Cai, Xiushan
Lv, Ganyun
Xu, Xiuling
He, Xiuhui
[J]. 2008 CHINESE CONTROL AND DECISION CONFERENCE, VOLS 1-11, 2008, : 4189 - 4192
[44] Controllability for a class of discrete-time Hamiltonian systems
Vaidya, U
Mezic, I
[J]. 42ND IEEE CONFERENCE ON DECISION AND CONTROL, VOLS 1-6, PROCEEDINGS, 2003, : 1351 - 1356
[45] CONTROLLABILITY OF DISCRETE-TIME INHOMOGENEOUS BILINEAR SYSTEMS
EVANS, ME
MURTHY, DNP
[J]. AUTOMATICA, 1978, 14 (02) : 147 - 151
[46] Remarks on Controllability of Discrete-time Bilinear Systems
Tie, Lin
Lin, Yan
[J]. 2013 25TH CHINESE CONTROL AND DECISION CONFERENCE (CCDC), 2013, : 1952 - 1955
[47] Constrained controllability of discrete-time bilinear systems
Cheng, Lingxiang
Tie, Lin
[J]. INTERNATIONAL JOURNAL OF SYSTEMS SCIENCE, 2022, 53 (02) : 431 - 446
[48] Approximate Controllability of Abstract Discrete-Time Systems
Henriquez, Hernan R.
Cuevas, Claudio
[J]. ADVANCES IN DIFFERENCE EQUATIONS, 2010,
[49] On global controllability of discrete-time control systems
SanMartin, LAB
[J]. MATHEMATICS OF CONTROL SIGNALS AND SYSTEMS, 1995, 8 (03) : 279 - 297
[50] Controllability and Stability of Discrete-Time Antilinear Systems
Wu, Ai-Guo
Duan, Guang-Ren
Liu, Wanquan
Sreeram, Victor
[J]. 2013 3RD AUSTRALIAN CONTROL CONFERENCE (AUCC), 2013, : 403 - 408

← 1 2 3 4 5 →