Fast multilevel augmentation method for nonlinear integral equations

Jian Chen

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Fast multilevel augmentation method for nonlinear integral equations

机译：非线性积分方程的快速多级扩充方法

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In this study, we extend the multilevel augmentation method for Hammerstein equations established in Chen et al. [Fast multilevel augmentation methods for solving Hammerstein equations, SIAM J. Numer. Anal. 47 (2009), pp. 2321-2346] to solve nonlinear Urysohn integral equations. Under certain differentiability assumptions on the kernel function, we show that the method enjoys the optimal convergence order and linear computational complexity. Finally, numerical experiments are presented to confirm the theoretical results and illustrate the efficiency of the method.

机译：在这项研究中，我们扩展了Chen等人建立的Hammerstein方程的多级扩充方法。 [用于解决Hammerstein方程的快速多级增强方法，SIAM J. Numer。肛门47（2009），第2321-2346页]来求解非线性Urysohn积分方程。在核函数的某些可微性假设下，我们证明该方法具有最优的收敛阶和线性计算复杂度。最后，通过数值实验验证了理论结果并说明了该方法的有效性。

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来源
《International journal of computer mathematics》 |2012年第3期|p.80-89|共10页
作者
Jian Chen;
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作者单位

Department of Mathematics, Foshan University, Foshan 528000, China;

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正文语种 eng
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关键词
multilevel augmentation method; multiscale decomposition; urysohn integral equations; orthogonal projection; galerkin scheme;

机译：多级增强方法多尺度分解urysohn积分方程;正交投影加勒金计划;
入库时间 2022-08-18 03:01:42

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1. Fast multilevel augmentation methods for nonlinear boundary integral equations [J] . Chen X., Chen Z., Wu B., SIAM Journal on Numerical Analysis . 2011,第5a6期

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2. Multilevel augmentation algorithms based on fast collocation methods for solving ill-posed integral equations [J] . Zhongying Chen, Shengpei Ding, Hongqi Yang Computers & mathematics with applications . 2011,第4期

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3. FAST MULTILEVEL AUGMENTATION METHODSWITH COMPRESSION TECHNIQUE FOR SOLVINGILL-POSED INTEGRAL EQUATIONS [J] . ZHONGYING CHEN, SIRUI CHENG, AND HONGQI YANGC The Journal of integral equations and applications . 2011,第1期

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4. A wideband fast integral equation solver combining multilevel fast multipole and multilevel Green's function interpolation method with fast Fourier transform acceleration [C] . Schobert Dennis T., Eibert Thomas F. 2011 30th URSI General Assembly and Scientific Symposium . 2011

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6. Homotopy perturbation method: a versatile tool to evaluate linear and nonlinear fuzzy Volterra integral equations of the second kind [O] . S. Narayanamoorthy, S. P. Sathiyapriya -1

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Fast multilevel augmentation method for nonlinear integral equations

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