A new Krylov subspace method based on rational approximation to solve stiff burnup equation

Li Xuezhong; Cai Jiejin

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A new Krylov subspace method based on rational approximation to solve stiff burnup equation

机译：基于有理逼近的Krylov子空间新方法求解刚性燃耗方程

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A burnup equation can be solved with matrix exponential method and its solution can be written as n(t) = e(At)n(0). In burnup calculation, general Krylov Subspace Method can solute a matrix-vector efficiently in a subspace but fails to keep a high precision. To solve this problem, a new kind of Krylov Subspace Method, Generalized Minimal Residual Method (GMRES) is implemented, based on a rational approximation method. It shows its great advantage in computation speed, which is more than four times faster than the same kind of rational approximation solved in a whole space while its accuracy is also guaranteed. Some optimizations, such as shift-Invariant technique, precondition technique and restart technique, are also implemented on burnup calculation. (C) 2018 Elsevier Ltd. All rights reserved.

机译：燃耗方程可以用矩阵指数法求解，其解可以写成n（t）= e（At）n（0）。在燃耗计算中，一般的Krylov子空间方法可以在子空间中有效地解矩阵向量，但不能保持较高的精度。为了解决这个问题，在有理逼近方法的基础上，实现了一种新型的Krylov子空间方法，即广义最小残差方法（GMRES）。它显示了其巨大的计算速度优势，比在整个空间中求解的同类有理逼近速度快四倍以上，同时还保证了精度。在燃耗计算上还实现了一些优化，如不变变量技术，前提技术和重启技术。（C）2018 Elsevier Ltd.保留所有权利。

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来源
《Annals of nuclear energy》 |2018年第8期|99-106|共8页
作者
Li Xuezhong; Cai Jiejin;
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作者单位

South China Univ Technol, Sch Elect Power, 381 Wushan Rd, Guangzhou 510640, Guangdong, Peoples R China;

South China Univ Technol, Sch Elect Power, 381 Wushan Rd, Guangzhou 510640, Guangdong, Peoples R China;

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正文语种 eng
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关键词
Burnup equation; Matrix exponential; Krylov Subspace Method; GMRES; Rational approximation;

机译：燃耗方程;矩阵指数;Krylov子空间法;GMRES;有理逼近;

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1. Numerical Solution of Stiff Burnup Equation with Short Half Lived Nuclides by the Krylov Subspace Method [J] . Akio YAMAMOTO, Masahiro TATSUMI, Naoki SUGIMURA Journal of nuclear science and technology . 2007,第2期

机译：短半衰期核素的刚性燃耗方程的Krylov子空间法数值解
2. Implementation of a new burnup solver based on the Krylov subspace method in SCOPE2 [J] . Masahiro TATSUMI, Kento YAMAMOTO, Yasuhiro KODAMA, Transactions of the American nuclear society . 2012,第Nova期

机译：在SCOPE2中基于Krylov子空间方法的新型燃尽求解器的实现
3. Analysis of the rational krylov subspace and ADI methods for solving the lyapunov equation [J] . Druskin V., Knizhnerman L., Simoncini V. SIAM Journal on Numerical Analysis . 2011,第5a6期

机译：有理Krylov子空间分析和ADI方法求解lyapunov方程
4. Rational Krylov subspace method (RKSM) for solving the Lyapunov equations of index-1 descriptor systems and application to balancing based model reduction [C] . M. Monir Uddin, M. Sumon Hossain, Mohammad Forhad Uddin International Conference on Electrical and Computer Engineering . 2016

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5. Krylov-Subspace Methods with Dynamic Deflated Restarting for Solving Adjoint Systems of Equations for Aerodynamic Shape Optimization [D] . Chen, Chih-Hao. 2020

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7. Numerical Solution of Stiff Burnup Equation with Short Half Lived Nuclides by the Krylov Subspace Method [O] . Akio YAMAMOTO, Masahiro TATSUMI, Naoki SUGIMURA 2007

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A new Krylov subspace method based on rational approximation to solve stiff burnup equation

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