| ²é¿´: 209 | »Ø¸´: 2 | ||
| ±¾Ìû²úÉú 1 ¸ö £¬µã»÷ÕâÀï½øÐв鿴 | ||
| µ±Ç°Ö»ÏÔʾÂú×ãÖ¸¶¨Ìõ¼þµÄ»ØÌû£¬µã»÷ÕâÀï²é¿´±¾»°ÌâµÄËùÓлØÌû | ||
laomao10521ľ³æ (СÓÐÃûÆø)
|
[ÇóÖú]
°ïæ¿´¿´ÎÄÕÂÊÇ·ñ±»¼ìË÷
|
|
|
Mean-square Practical Stability for Stochastic System with Additive Noise Controlled by Optimal Feedback ÊÇ·ñ±»SCI¼ìË÷ @°¢Å¬ ·¢×ÔСľ³æAndroid¿Í»§¶Ë |
»Ø¸´´ËÂ¥» ²ÂÄãϲ»¶
Ò»Ö¾Ô¸ºÓ±±¹¤Òµ´óѧ0817»¯¹¤278·ÖÇóµ÷¼Á
ÒѾÓÐ3È˻ظ´
-
»¯Ñ§308·ÖÇóµ÷¼Á
ÒѾÓÐ3È˻ظ´
-
085600²ÄÁÏÓ뻯¹¤µ÷¼Á
ÒѾÓÐ11È˻ظ´
-
335·Ö | ²ÄÁÏÓ뻯¹¤×¨Ë¶ | GPA 4.07 | ÓпÆÑоÀú
ÒѾÓÐ3È˻ظ´
-
Ò»Ö¾Ô¸ÎäÀí²ÄÁϹ¤³Ì348Çóµ÷¼Á
ÒѾÓÐ9È˻ظ´
-
279·ÖÇóµ÷¼Á Ò»Ö¾Ô¸211
ÒѾÓÐ18È˻ظ´
-
0703»¯Ñ§Çóµ÷¼Á
ÒѾÓÐ5È˻ظ´
-
²ÄÁÏ292µ÷¼Á
ÒѾÓÐ3È˻ظ´
-
Ò»Ö¾Ô¸ÉÂʦ´óÉúÎïѧ071000£¬298·Ö£¬Çóµ÷¼Á
ÒѾÓÐ3È˻ظ´
-
306Çó0703µ÷¼ÁÒ»Ö¾Ô¸»ªÖÐʦ·¶
ÒѾÓÐ7È˻ظ´
laomao10521
ľ³æ (СÓÐÃûÆø)
- Ó¦Öú: 0 (Ó׶ùÔ°)
- ½ð±Ò: 3568.5
- Ìû×Ó: 129
- ÔÚÏß: 27.4Сʱ
- ³æºÅ: 2800782
- ×¢²á: 2013-11-14
- ÐÔ±ð: GG
- רҵ: ÈÏÖªÐÄÀíѧ
3Â¥2016-06-22 11:22:30
baiyuefei
°æÖ÷ (ÎÄѧ̩¶·)
·çÑ©
- Ó¦Öú: 4642 (¸±½ÌÊÚ)
- ¹ó±ö: 46.969
- ½ð±Ò: 658104
- É¢½ð: 11616
- ºì»¨: 995
- ɳ·¢: 81
- Ìû×Ó: 69424
- ÔÚÏß: 13328.3Сʱ
- ³æºÅ: 676696
- ×¢²á: 2008-12-18
- ÐÔ±ð: GG
- רҵ: ºÏ³ÉÒ©Îﻯѧ
- ¹ÜϽ: Óлú½»Á÷
¡¾´ð°¸¡¿Ó¦Öú»ØÌû
¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï ¡ï
¸Ðл²ÎÓ룬ӦÖúÖ¸Êý +1
laomao10521(lazy½õϪ´ú·¢): ½ð±Ò+20, ÐÖú½áÌû£¬¸ÐлӦÖú£¡ 2016-06-24 09:12:16
lazy½õϪ: LS-EPI+1, ¸ÐлӦÖú£¡ 2016-06-24 09:12:21
¸Ðл²ÎÓ룬ӦÖúÖ¸Êý +1
laomao10521(lazy½õϪ´ú·¢): ½ð±Ò+20, ÐÖú½áÌû£¬¸ÐлӦÖú£¡ 2016-06-24 09:12:16
lazy½õϪ: LS-EPI+1, ¸ÐлӦÖú£¡ 2016-06-24 09:12:21
|
https://apps.webofknowledge.com/ ... age=1&doc=1 Mean-square practical stability for uncertain stochastic system with additive noise controlled by optimal feedback ×÷Õß:Mao, DH (Mao, Dong-hui)[ 1 ] ; Fang, YW (Fang, Yang-wang)[ 1 ] ; Yang, PF (Yang, Peng-fei)[ 1 ] ; Wu, YL (Wu, You-li)[ 1 ] ; Yong, XJ (Yong, Xiao-ju)[ 1 ] OPTIK ¾í: 127 ÆÚ: 13 Ò³: 5334-5340 ³ö°æÄê: 2016 ÕªÒª Stability concepts addressed in the framework of Lyapunov are not suitable to analyze the stability of stochastic systems with additive noise since it has no equilibrium. The mean-square practical stability is introduced to study the stability of uncertain stochastic systems with additive noise controlled by linear quadratic optimal feedback. By using Lyapunov functional methods and the comparison principle, criteria on mean-square practical stability of stochastic systems with partially known uncertainties and norm bounded parameter uncertainties are deduced, respectively. Some numerical examples and simulations are given to illustrate the validity of the theoretical analysis. (C) 2016 Elsevier GmbH. All rights reserved. ¹Ø¼ü´Ê ×÷Õ߹ؼü´Ê:Mean-square practical stability; Uncertain stochastic system; Additive noise; Linear-quadratic optimal feedback; Lyapunov functional method ×÷ÕßÐÅÏ¢ ͨѶ×÷ÕßµØÖ·: Mao, DH (ͨѶ×÷Õß)Air Force Engn Univ, Aeronaut & Astronaut Engn Coll, Xian, Peoples R China. µØÖ·: [ 1 ] Air Force Engn Univ, Aeronaut & Astronaut Engn Coll, Xian, Peoples R China µç×ÓÓʼþµØÖ·:iheartmay@163.com, ywfang2008@sohu.com, pfyang1988@126.com, wu_youli2014@163.com, xjyong1987@163.com ³ö°æÉÌ ELSEVIER GMBH, URBAN & FISCHER VERLAG, OFFICE JENA, P O BOX 100537, 07705 JENA, GERMANY, https://www.elsevier.com Àà±ð / ·ÖÀà Ñо¿·½Ïò:Materials Science; Physics; Acoustics; Optics CC ר¼/ºÏ¼¯  hysical, Chemical & Earth Sciences (PCES); Engineering, Computing & Technology (ECT)ѧ¿Æ:APPLIED PHYSICS/CONDENSED MATTER/MATERIALS SCIENCE OPTICS & ACOUSTICS ÎÄÏ×ÐÅÏ¢ ÎÄÏ×ÀàÐÍ: Article ÓïÖÖ:English Èë²ØºÅ: CCC:000376810000034 ISSN: 0030-4026 ÆÚ¿¯ÐÅÏ¢ Ŀ¼£º Current Contents Connect® ÆäËûÐÅÏ¢ ISI ÎÄÏ×´«µÝºÅ: DN1EV |
2Â¥2016-06-22 09:24:19
10