A TRUST REGION METHOD FOR SOLVING DISTRIBUTED PARAMETER IDENTIFICATION PROBLEMS 被引量：2

A TRUST REGION METHOD FOR SOLVING DISTRIBUTED PARAMETER IDENTIFICATION PROBLEMS

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摘要 This paper is concerned with the ill-posed problems of identifying a parameter in an elliptic equation which appears in many applications in science and industry. Its solution is obtained by applying trust region method to a nonlinear least squares error problem. Trust region method has long been a popular method for well-posed problems. This paper indicates that it is also suitable for ill-posed problems. Numerical experiment is given to compare the trust region method with the Tikhonov regularization method. It seems that the trust region method is more promising. This paper is concerned with the ill-posed problems of identifying a parameter in an elliptic equation which appears in many applications in science and industry. Its solution is obtained by applying trust region method to a nonlinear least squares error problem. Trust region method has long been a popular method for well-posed problems. This paper indicates that it is also suitable for ill-posed problems. Numerical experiment is given to compare the trust region method with the Tikhonov regularization method. It seems that the trust region method is more promising.

作者 Yan-fei Wang Ya-xiang Yuan(LSEC, ICMSEC, Academy of Mathematics and System Sciences, Chinese Academy of Sciences,Beijing 100080, China)

出处《Journal of Computational Mathematics》 SCIE CSCD 2003年第6期759-772,共14页 计算数学（英文）

基金 Partially supported by Chinese NSF grant 19731010 and the Knowledge Innovation Program of CAS.

关键词 Parameter identification Ill-posed problems Trust region. Parameter identification, Ill-posed problems, Trust region.

分类号 O175.25 [理学—基础数学]

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参考文献24

1Banks T and Kunisch K, Estimation Techniques for Distributed Parameter Systems, 1989,Birkhaeuser.
2Bjoerck A and Eldén L, Methods in Numerical Algebra for Ill-posed Problems, Technical Report LiTH-MAT-R-1979-33, Department of Mathematics, Linkoeping University, 1979.
3Chavent G and Lemonnier P, Identification de la Non-Linearite' D'Une Equation Parabolique Quasi-lineare, Applied Math and Opt, 26, (1974), 121-162.
4Duff I S, Nocedal J and Reid J K, The Use of Linear Programming for the Solution of Sparse Sets of Nonlinear Equations, SIAM J Sci Star Comput, 8 (1987), 99-108.
5Engl H W, Hanke M and Neubauer, Regularization of Inverse Problems, Dordrecht: Kluwer,1996.
6Fletcher R, Practical Methods of Optimization (second edition), John Wiley and Sons, Chichester,1987.
7Fletcher R, A Model Algorithm for Composite NDO Problem, Math Prog Study, 17(1982),67-76.
8Golub G, Heath M and Wahba G, Generalized Cross-Validation as a method for Choosing a Good Ridge Parameter, Technometrics, 21 (1979), 215-223.
9Groetsch C W, The Theory of Tikhonov Regularization for Fredholm Equations of The First Kind (Boston,MA:Pitman), 1984.
10Hansen P C, Analysis of Discrete Ill-Posed Problems by means of the L-curve, SIAM Review, 34(1992), 561-580.

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1WEN Zaiwen & WANG Yanfei State Key Laboratory of Scientific Engineering Computing, Institute of Computational Mathematics and Scientific/Engineering Computing, Academy of Mathematics and System Sciences, Chinese Academy of Sciences, Beijing 100080, China,National Key Laboratory on Remote Sensing Science, Institute of Remote Sensing Applications, Chinese Academy of Sciences, Beijing 100101, China.A new trust region algorithm for image restoration[J].Science China Mathematics,2005,48(2):169-184. 被引量：3
2王彦飞,袁亚湘,张洪超.A trust region-CG algorithm for deblurring problem in atmospheric image reconstruction[J].Science China Mathematics,2002,45(6):731-740. 被引量：5
3宛新林,席道瑛,高尔根,沈兆武.用改进的光滑约束最小二乘正交分解法实现电阻率三维反演[J].地球物理学报,2005,48(2):439-444. 被引量：41
4傅红笋,韩波.二维波动方程速度的正则化-同伦-测井约束反演[J].地球物理学报,2005,48(6):1441-1448. 被引量：21
5徐海浪,吴小平.电阻率二维神经网络反演[J].地球物理学报,2006,49(2):584-589. 被引量：73
6陈勇,韩波.时间推移地震反演的连续模型与算法[J].地球物理学报,2006,49(4):1164-1168. 被引量：8
7强建科,罗延钟.三维地形直流电阻率有限元法模拟[J].地球物理学报,2007,50(5):1606-1613. 被引量：50
8鲁晶津,吴小平,Klaus Spitzer.直流电阻率三维正演的代数多重网格方法(英文)[J].地球物理学报,2010,53(3):700-707. 被引量：26
9汤井田,王飞燕,任政勇.基于非结构化网格的2.5-D直流电阻率自适应有限元数值模拟(英文)[J].地球物理学报,2010,53(3):708-716. 被引量：23
10汤井田,公劲喆.三维直流电阻率有限元-无限元耦合数值模拟[J].地球物理学报,2010,53(3):717-728. 被引量：22

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1曹静杰,修乃华.模糊图像恢复的投影重开始共轭梯度法[J].数值计算与计算机应用,2009,30(1):70-80.
2韩波,窦以鑫,丁亮.电阻率成像的混合正则化反演算法[J].地球物理学报,2012,55(3):970-980. 被引量：13

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1李伦,吴雄斌,龙超,刘斌.基于正则化方法的高频地波雷达海浪方向谱反演[J].地球物理学报,2013,56(1):219-229. 被引量：13
2赵东东,张钱江,戴世坤,陈龙伟,李昆.基于高斯牛顿法的二维直流电阻率法的快速反演[J].中国有色金属学报,2015,25(6):1662-1671. 被引量：7
3叶益信,张志勇,吴信民,李曼,丁尚见.基于最小支撑泛函模型约束的电阻率法三维聚焦反演[J].地球物理学进展,2015,30(5):2399-2403. 被引量：3
4SUN Ruixue,HAN Liguo,SUN Eryan.Dual-parameter shaping regularized full waveform inversion in frequency domain[J].Global Geology,2015,18(4):258-262. 被引量：1
5董一飞,张致付.正则化方法在无线电波层析中的应用[J].CT理论与应用研究（中英文）,2016,25(3):287-298. 被引量：4
6唐利民,郑健龙.基于区间适定和区间不适定性理论的参数反演方法[J].土木工程学报,2016,49(11):91-96. 被引量：3
7董一飞,张致付.基于菲涅尔带理论的无线电波层析正则化方法研究[J].地球物理学进展,2017,32(1):18-25. 被引量：7
8蒋林城,肖宏跃,丁尚见,贾毅,吴强.跨孔电阻率法装置灵敏度分析及分辨率讨论[J].地球物理学进展,2018,33(2):815-822. 被引量：9
9余鹏洲,张志勇,黄临平,楼凯峰,梁若楠.带井观测高密度电阻率法2.5维非结构化网格反演[J].地球物理学进展,2019,34(4):1687-1693. 被引量：3
10Huang Xian-Yang,Deng Ju-Zhi,Chen Xiao,Wang Xian-Xiang,Chen Hui,Yu Hui.Magnetotelluric extremum boundary inversion based on different stabilizers and its application in a high radioactive waste repository site selection[J].Applied Geophysics,2019,16(3):367-377. 被引量：3

1YUAN Gong-lin,WEI Zeng-xin,LU Xi-wen.A Nonmonotone Trust Region Method for Solving Symmetric Nonlinear Equations[J].Chinese Quarterly Journal of Mathematics,2009,24(4):574-584. 被引量：3
2章祥荪.TRUST REGION METHOD IN NEURAL NETWORK[J].Acta Mathematicae Applicatae Sinica,1997,13(4):342-352.
3L.P. Sun(Department of Mathematics, Nanjing University, Jiangsu, China).A RESTRICTED TRUST REGION METHOD WITH SUPERMEMORY FOR UNCONSTRAINED OPTIMIZATION[J].Journal of Computational Mathematics,1996,14(3):195-202. 被引量：1
4XIANG Xiao ling (Department of Mathematics, Guizhou University, Guiyang 550025, China).OPTIMAL CONTROL OF A CLASS OF DISTRIBUTED PARAMETER DELAY SYSTEMS[J].Systems Science and Mathematical Sciences,2000,13(1):31-41. 被引量：1
5王彦飞,袁亚湘,张洪超.A trust region-CG algorithm for deblurring problem in atmospheric image reconstruction[J].Science China Mathematics,2002,45(6):731-740. 被引量：5
6邓乃扬,肖奕,周方俊,吴育华.A NONMONOTONE TRUST REGION METHOD FOR NONLINEAR LEAST SQUARES PROBLEMS[J].Numerical Mathematics A Journal of Chinese Universities(English Series),1994,3(1):33-53.
7ZHOU QingHua,ZHANG YaRui,XU FengXia,GENG Yan,SUN XiaoDian.An improved trust region method for unconstrained optimization[J].Science China Mathematics,2013,56(2):425-434. 被引量：5
8LingshengMeng,Bing Zheng.STRUCTURED CONDITION NUMBERS FOR THE TIKHONOV REGULARIZATION OF DISCRETE ILL-POSED PROBLEMS[J].Journal of Computational Mathematics,2017,35(2):169-186.
9ZOU Zhenyu ,CHOW Chenyu(Chengdu Institute of Computer Applications, Academia Sinica, Chengdu 610041, China).A KIND OF STRUCTURE MODELS FOR DOUBLEPOROSITY MEDIUM SYSTEMS AND ITS IDENTIFICATION PROBLEMS[J].Systems Science and Mathematical Sciences,1998,11(3):260-271. 被引量：1
10金其年.A UNIFIED TREATMENT OF REGULARIZATION METHODS FOR LINEAR ILL-POSED PROBLEMS[J].Numerical Mathematics A Journal of Chinese Universities(English Series),2000,9(1):111-120.

Journal of Computational Mathematics

2003年第6期

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A TRUST REGION METHOD FOR SOLVING DISTRIBUTED PARAMETER IDENTIFICATION PROBLEMS 被引量：2

参考文献24

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