A posteriori error estimates for the fractional-step ϑ-scheme for linear parabolic equations

Fotini Karakatsani

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A posteriori error estimates for the fractional-step ϑ-scheme for linear parabolic equations

机译：线性抛物方程的分数步法的后验误差估计

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We derive residual-based a posteriori error estimates of optimal order for time discretizations of linear parabolic equations by the fractional-step ϑ-scheme. We first consider the time semidiscrete problem. The main tool of our analysis is an appropriate reconstruction of the piecewise linear interpolant of the approximate solution that leads to a residual of optimal order. Next we extend the above-mentioned results to the case of a full discretization. The theoretical results are justified with numerical experiments.

机译：我们通过分数步ϑ方案导出线性抛物方程的时间离散化的最优阶的基于残差的后验误差估计。我们首先考虑时间半离散问题。我们分析的主要工具是对近似解的分段线性插值进行适当的重构，从而导致最优阶的残差。接下来，我们将上述结果扩展到完全离散化的情况。理论结果通过数值实验证明是正确的。

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《IMA Journal of Numerical Analysis》 |2012年第1期|p.141-162|共22页
作者
Fotini Karakatsani;
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Department of Mathematics and Statistics, University of Cyprus, P.O. Box. 20537, CY-1678 Nicosia, Cyprus;

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专利

1. A posteriori error estimates for the fractional-step θ-scheme for linear parabolic equations [J] . Karakatsani F. IMA Journal of Numerical Analysis . 2012,第1期

机译：线性抛物方程的分数步θ方案的后验误差估计
2. A posteriori error estimates for fully discrete fractional-step upsilon-approximations for parabolic equations [J] . Karakatsani Fotini IMA Journal of Numerical Analysis . 2016,第3期

机译：抛物方程的完全离散分数步upsilon逼近的后验误差估计
3. A posteriori error estimates for nonlinear problems. L-r(0,T;L-rho(Omega))-error estimates for finite element discretizations of parabolic equations [J] . Verfurth R. Mathematics of computation . 1998,第224期

机译：非线性问题的后验误差估计。抛物方程的有限元离散化的L-r（0，T; L-rho（Omega））-误差估计
4. A priori error estimates of mixed methods for quadratic convex optimal control problem governed by nonlinear parabolic equations [C] . Z. L. Lu, Y. P. Chen International Conference on Electrical Engineering, Computing Science and Automatic Control . 2009

机译：非线性抛物线方程（非线性抛物线方程）治理二次凸出最优控制问题的优先误差估计
5. Long-term error estimates for nonlinear parabolic equations. [D] . Filippova, Daria Vladimirovna. 2001

机译：非线性抛物方程的长期误差估计。
6. A posteriori error estimates of spectral method for nonlinear parabolic optimal control problem [O] . Lin Li, Zuliang Lu, Wei Zhang, -1

机译：非线性抛物线最优控制问题的频谱方法后验误差估计
7. A Posteriori Error Estimates for Nonlinear Problems. L r (0,T; L rho (Omega))-Error Estimates for Finite Element Discretizations of Parabolic Equations [O] . R. Verfürth, R. Verf Urth 2007

机译：非线性问题的后验误差估计。 L r（0，T; L rho（Omega）） - 抛物型方程有限元离散的误差估计
8. Posteriori Error Estimate and Automatic Time Step Control for a Backward Euler Discretization of a Parabolic Equation [R] . Johnson, C., Nie, Y. Y., Thomee, V. 1985

机译：抛物型方程后向欧拉离散的后验误差估计与自动时间步长控制

A posteriori error estimates for the fractional-step ϑ-scheme for linear parabolic equations

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