Model-based Predictive Control for Spatially-distributed Systems Using Dimensional Reduction Models 被引量：3

Model-based Predictive Control for Spatially-distributed Systems Using Dimensional Reduction Models

下载PDF

导出

摘要 In this paper, a low-dimensional multiple-input and multiple-output （MIMO） model predictive control （MPC） configuration is presented for partial differential equation （PDE） unknown spatially-distributed systems （SDSs）. First, the dimension reduction with principal component analysis （PCA） is used to transform the high-dimensional spatio-temporal data into a low-dimensional time domain. The MPC strategy is proposed based on the online correction low-dimensional models, where the state of the system at a previous time is used to correct the output of low-dimensional models. Sufficient conditions for closed-loop stability are presented and proven. Simulations demonstrate the accuracy and efficiency of the proposed methodologies. In this paper, a low-dimensional multiple-input and multiple-output （MIMO） model predictive control （MPC） configuration is presented for partial differential equation （PDE） unknown spatially-distributed systems （SDSs）. First, the dimension reduction with principal component analysis （PCA） is used to transform the high-dimensional spatio-temporal data into a low-dimensional time domain. The MPC strategy is proposed based on the online correction low-dimensional models, where the state of the system at a previous time is used to correct the output of low-dimensional models. Sufficient conditions for closed-loop stability are presented and proven. Simulations demonstrate the accuracy and efficiency of the proposed methodologies.

作者 Meng-Ling Wang Ning Li Shao-Yuan Li

机构地区 Institute of Automation Key Laboratory of System Control and Information Processing

出处《International Journal of Automation and computing》 EI 2011年第1期1-7,共7页 国际自动化与计算杂志（英文版）

基金 supported by National High Technology Research and Development Program of China (863 Program)(No. 2009AA04Z162) National Nature Science Foundation of China(No. 60825302, No. 60934007, No. 61074061) Program of Shanghai Subject Chief Scientist,"Shu Guang" project supported by Shang-hai Municipal Education Commission and Shanghai Education Development Foundation Key Project of Shanghai Science and Technology Commission, China (No. 10JC1403400)

关键词 Spatially-distributed system principal component analysis （PCA） time/space separation dimension reduction model predictive control （MPC）. Spatially-distributed system principal component analysis （PCA） time/space separation dimension reduction model predictive control （MPC）.

分类号 TP273 [自动化与计算机技术—检测技术与自动化装置] TP391.4 [自动化与计算机技术—计算机应用技术]

引文网络
相关文献

参考文献26

1P.D.Christofides.Nonlinear and Robust Control of PDE Systems:Methods and Applications to Transport-reaction Processes,Boston,USA:Birkhauser,2001.
2E.Aggelogiannaki,H.Sarimveis.Nonlinear model predictive control for distributed parameter systems using data driven artificial neural network models.Computers and Chemical Engineering,vol.32,no.6,pp.1225 1237,2008.
3D.Zheng,K.A.Hoo.System identification and modelbased control for distributed parameter systems.Computers and Chemical Engineering,vol.28,no.8,pp.1361-1375,2004.
4H.Shang,J.F.Forbes,M.Cuay.Feedback control of hyperbolic distributed parameter systems.Chemical Engineering Science,vol.60,no.4,pp.969-980,2005.
5E.Aggelogiannaki,H.Sarimveis.Robust nonlinear H∞control of hyperbolic distributed parameter systems.Control Engineering Practice,vol.17,no.6,pp.723-732,2009.
6J.Baker,P.D.Christofides.Finite-dimensional approximation and control of nonlinear parabolic PDE systems.International Journal of Control,vol.73,no.5,pp.439-456,2000.
7A.Armaou,P.D.Christofides.Dynamic optimization of dissipative PDE systems using nonlinear order reduction.Chemical Engineering Science,vol.57,no.24,pp.5083-5114,2002.
8H.Deng,H.X.Li,G.R.Chen.Spectral-approximationbased intelligent modeling for distributed thermal processes.IEEE Transactions on Control Systems Technology,vol.13,no.5,pp.686-700,2005.
9W.W.Hsieh.Nonlinear multivariate and time series analysis by neural network methods.Review of Geophysics,vol.42,RG1003,2004.
10S.Mandelj,I.Grabec,E.Govekar.Statistical approach to modeling of spatiotemporal dynamic.International Journal of Bifurcation and Chaos,vol.11,no.11,pp.2731-2738,2001.

同被引文献26

1刘斌,苏宏业,褚健.一种基于最小二乘支持向量机的预测控制算法[J].控制与决策,2004,19(12):1399-1402. 被引量：38
2宋夫华,李平.基于支持向量机α阶逆系统方法的非线性内模控制[J].自动化学报,2007,33(7):778-781. 被引量：34
3李劼,张红亮,陈湘涛,刘代飞,邹忠.基于图像处理及模式聚类的二次仿真方法及其在回转窑温度监控中的应用[J].中国有色金属学报,2007,17(7):1182-1187. 被引量：3
4Richaler J, et al. Model Predictive Heuristic Control: Applica- tions to Industrial Proeedsses[J]. Automatiea, 1978,14(5) :413- 428.
5Lv Guo-fang, Song Jin-ya, Liang-hua, et al. Inverse system con- trol of nonlinear systems using LS-SVM[C] //Proeeedings of the 26th Chinese Control Conferenc. Zhangiiajie, 2007 : 233-236.
6Song Yong-xian, Zhang Han-xia, Gong Cheng-long, et al. Non- linear System Control Based on Multi-step Predicted and Neural Network Inverse[C]//Intelligent Computation Technology and Automation(ICICTA). 2010 : 809-812.
7Suykens J A K, Lukas L, Vandewalle J. Sparse approximation u- sing least squares support vector maehine[C] // IEEE Int Sym- posium 071 Circuits and Systems. Geneva, 2000(1) : 757-760.
8Suykens J A K. Nonlinear modeling and support vector machines [C]//IEEE Instrumentation and Measurement Technology Conferenc. Budapest, Hungary: Institute of Electrical and Elec- tronics Engineers Inc., 2001 : 287-295.
9杨红,罗飞,许玉格,等.基于混沌优化的LS-SVM的非线性预测控制方法[J].计算机与应用,2010,46(5):229-232.
10Bhat N V, Minderman P A, McAvoy J T, et al. Modeling chemi- cal process systems via neural eomputation[J]. IEEE Control Systems Magazine, 1990(10) : 24-30.

引证文献3

1Jie-Sheng Wang,Xiu-Dong Ren.GLCM Based Extraction of Flame Image Texture Features and KPCA-GLVQ Recognition Method for Rotary Kiln Combustion Working Conditions[J].International Journal of Automation and computing,2014,11(1):72-77. 被引量：6
2陈伟利,范玉刚,吴建德,王晓东,黄国勇.基于LS-SVM/PID复合逆系统的预测控制[J].计算机科学,2012,39(8):239-241. 被引量：2
3Xian-Xia Zhang,Zhi-Qiang Fu,Shao-Yuan Li,Tao Zou,Bing Wang.A Time/Space Separation Based 3D Fuzzy Modeling Approach for Nonlinear Spatially Distributed Systems[J].International Journal of Automation and computing,2018,15(1):52-65. 被引量：1

二级引证文献9

1温冬琴,王建东,张霞.基于GM-LSSVR机场噪声时间序列预测模型[J].计算机科学,2013,40(9):198-200. 被引量：2
2朱永红,熊朦,赵一峰,王伟.基于K均值聚类陶瓷窑炉火焰图像分割方法[J].陶瓷学报,2016,37(1):86-90. 被引量：4
3徐焕良,王珂,任守纲,王浩云.基于非合作博弈的分布式模型预测控制优化算法[J].计算机工程与科学,2016,38(7):1484-1494. 被引量：2
4陈金英.基于3D打印产品质量分析的实验研究[J].制造技术与机床,2019(1):104-107. 被引量：3
5李聪,马勋,杨锐,张辉.基于形状和纹理特征的正庚烷环形油池火特性[J].清华大学学报（自然科学版）,2021,61(6):502-508. 被引量：5
6李涛,张振庭,陈华.基于深度学习的回转窑燃烧状态监测系统[J].控制工程,2021,28(5):827-832.
7蔡国源,牛玉广,刘雪菲,杜鸣,张庭.基于图像卷积变分自编码的电站锅炉燃烧稳定性评价方法[J].仪器仪表学报,2022,43(3):210-220. 被引量：3
8马雷,杨顺清,王欢欢,翟家琛,徐健傲.融合图像显著性特征的轻量级目标检测算法[J].汽车工程,2024,46(1):84-91.
9Zhong-Hua Hao,Shi-Wei Ma,Fan Zhao.Atlas Compatibility Transformation:A Normal Manifold Learning Algorithm[J].International Journal of Automation and computing,2015,12(4):382-392.

1李双庆,邱英.第四讲计算机控制空间的通信[J].今日电子,1997(10):54-57.
2张鹤.新形势下如何加强部队信息安全防线的研究[J].信息与电脑（理论版）,2013,0(9):38-39. 被引量：1
3杨林,徐宏喆.一种板形降维模型的研究与实现[J].陕西科技大学学报（自然科学版）,2010,28(6):69-71.
4任俊,李志能,傅一平.基于RGB降维模型和小波的彩色图像边缘检测[J].浙江大学学报（工学版）,2004,38(7):856-859. 被引量：7
5刘丽敏,樊晓平,廖志芳.联合L1范数和迹范数的数据降维模型及其优化算法[J].铁道学报,2013,35(5):69-74.
6CAO Jiannong,ZHOU Jingyang,ZHU Weiweit,LI Xuhui.Mobile agent-enabled framework for structuring and building distributed systems on the internet[J].Science in China(Series F),2006,49(6):885-905.
7曾庆盛,严宣辉,舒才良.人工免疫投影寻踪降维模型——AI-PPC[J].计算机应用,2010,30(9):2290-2293. 被引量：2
8Call for Papers The 16th IEEE Int’l Conf. on Parallel and Distributed Systems[J].软件学报,2010,21(4):801-801.
9万建武,杨明,吉根林,陈银娟.一种面向人脸识别的加权代价敏感局部保持投影[J].软件学报,2013,24(5):1155-1164. 被引量：9
10张常有,曹元大,王玉梅,于炯.入侵检测系统中的相反性综合降维模型[J].中山大学学报（自然科学版）,2009,48(1):133-136.

International Journal of Automation and computing

2011年第1期

浏览历史

内容加载中请稍等...

Model-based Predictive Control for Spatially-distributed Systems Using Dimensional Reduction Models 被引量：3

参考文献26

同被引文献26

引证文献3

二级引证文献9

相关作者

相关机构

相关主题

浏览历史