Asymptotic behaviour of the Galerkin and the finite element collocation methods for a parabolic equation

Onah SE.

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Asymptotic behaviour of the Galerkin and the finite element collocation methods for a parabolic equation

机译：Galerkin的渐近性质与抛物型方程的有限元配置方法。

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The asymptotic convergence of the solution of a parabolic equation is proved. The proof is based on two methods namely, the Galerkin method expressed in terms of linear splines and the Finite Element Collocation method expressed by cubic spline basis functions. Both methods are considered in continuous time. The asymptotic rate of convergence for the two methods is found to be of order O(h(2)). (C) 2002 Elsevier Science Inc. All rights reserved. [References: 4]

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《Applied mathematics and computation》 |2002年第3期|共7页
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Onah SE.;
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正文语种 eng
中图分类应用数学;
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1. Asymptotic behaviour of the Galerkin and the finite element collocation methods for a parabolic equation [J] . Onah SE. Applied mathematics and computation . 2002,第2a3期

机译：Galerkin的渐近性质与抛物型方程的有限元配置方法。
2. Error estimates in weak Galerkin finite element methods for parabolic equations under low regularity assumptions [J] . Bhupen Deka, Naresh Kumar Applied numerical mathematics . 2021,第Apra期

机译：低规律假设下抛物方程弱Galerkin有限元方法的误差估计
3. Nonuniform Alikhanov Linearized Galerkin Finite Element Methods for Nonlinear Time-Fractional Parabolic Equations [J] . Zhou Boya, Chen Xiaoli, Li Dongfang Journal of Scientific Computing . 2020,第2期

机译：非均匀Alikhanov线性化Galerkin非线性时间分数抛物方程的有限元方法
4. Kernel-Based Collocation Methods Versus Galerkin Finite Element Methods for Approximating Elliptic Stochastic Partial Differential Equations [C] . Gregory E. Fasshauer, Qi Ye International workshop on meshfree methods for partial differential equations . 2013

机译：基于核的搭配方法与Galerkin有限元方法近似的椭圆形随机偏微分方程
5. An efficient algorithm based on quadratic spline collocation and finite difference methods for parabolic partial differential equations. [D] . Chen, Tong. 2005

机译：一种基于二次样条搭配和有限差分法的抛物型偏微分方程的高效算法。
6. A Bivariate Chebyshev Spectral Collocation Quasilinearization Method for Nonlinear Evolution Parabolic Equations [O] . S. S. Motsa, V. M. Magagula, P. Sibanda -1

机译：非线性发展抛物型方程的二元Chebyshev谱配置拟线性化方法。
7. Kernel-based Collocation Methods versus Galerkin Finite Element Methods for Approximating Elliptic Stochastic Partial Differential Equations [O] . Gregory E. Fasshauer, Qi Ye 2013

机译：近似椭圆随机偏微分方程的基于核的搭配方法与Galerkin有限元方法
8. Solving a Parabolic Equation by the Combined Discontinuous-Galerkin Petrov-Galerkin Finite Element Method [R] . Freund, J. 1990

机译：用petrov-Galerkin有限元方法求解抛物型方程

Asymptotic behaviour of the Galerkin and the finite element collocation methods for a parabolic equation

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