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联立法中全局和局部正交配置算法 被引量:7

Global versus local orthogonal collocation in simultaneous approach
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摘要 化工过程的动态优化控制命题大多可以写成微分代数混合方程组(differential algebraic equations)的形式,联立法是求解该类命题的一种重要的数值方法。目前联立法中常用的离散方法是局部法,其中有限元正交配置(orthogonal collocation on finite elements)具有精度高、计算量小、稳定性好等优点。然而伪谱法(pseudo-spectral method)作为一种全局法,在离散中也有独特的优点,特别是具有指数级的收敛速度和较高精度,而且产生的NLP规模较小。本文分别以有限元正交配置法和伪谱法代表局部法和全局法比较其原理,并讨论离散配置点以及其在两种方法上的不同应用,针对离散后两种方法产生的NLP,分别提出判据以保证足够的自由度,最后用连续DAEs与不连续优化控制两个例子进一步比较这两种方法得出,如果命题平滑采用PS方法具有更好的收敛速度。 Most of the dynamic optimal control problems in chemical engineering can be written in the form of differential algebraic equations (DAEs). Simultaneous approach is an important method for solving these problems. The discretization strategies often used in this approach are local methods, for instance, orthogonal collocation on finite elements (OCFE), which has many advantages. Pseudo-spectral (PS), as a global method, has its own unique properties. It may offer a rapid convergence rate for the approximation of analytic functions and has high precision and low computational effort with a simple structure. As the representations of local method and global method respectively, OCFE and PS were compared. The collocation points and their different distributions were presented, and the degree of freedom (DOF) of non-linear programming (NLP) after discretization was discussed, as well as the criteria were offered to ensure the DOF of the NLPs. At last, a continuous case and a discontinuous case were studied, and it was concluded that if the problem was smooth enough then the convergence of PS was better than that of OCFE.
作者 陈杨 邵之江 钱积新 王可心
机构地区 浙江大学工业控制技术国家重点实验室
出处 《化工学报》 EI CAS CSCD 北大核心 2010年第2期384-391,共8页 CIESC Journal
基金 国家重点基础研究发展计划项目(2009CB320603)~~
关键词 联立法 有限元正交配置法 伪谱法 simultaneous approach orthogonal collocation on finite element pseudo-spectral method
分类号 O212.1 [理学—概率论与数理统计] TQ021.4 [化学工程]
  • 相关文献

参考文献17

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二级参考文献21

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共引文献22

同被引文献41

  • 1Biegler L T,Cervantes A M,W#228;chter A.Advances in simultaneous strategies for dynamic process optimization[J].Chemical Engineering Science,2002,57(4):575-593.
  • 2Shen Hang(沈航).Modeling of slurry polyethylene processes using Aspen Plus.Hangzhou:Zhejiang University,2006.
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  • 6Soares J B P.Mathematical modelling of the microstructure of polyolefins made by coordination polymerization:a review[J].Chemical Engineering Science,2001,56(3):4131-4153.
  • 7Feng Lianfang(冯连芳).Modeling of catalytic propylene polymerization reactor and process.Hangzhou:Zhejiang University,2006.
  • 8Zhan Zhiliang(占志良).Simulation and optimization of an industrial HDPE slurry process based on equation oriented models.Hangzhou:Zhejiang University,2012.
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  • 10Kameswaran S,Biegler L T.Simultaneous dynamic optimization strategies:recent advances and challenges[J].Computers&Chemical Engineering,2006,30(10/11/12):1560.

引证文献7

二级引证文献18

化工学报
2010年 第2期

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