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Asymptotically Exact a Posteriori Error Estimates for Non-Symmetric Eigenvalue Problems
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作者 Jun ZHANG Jiayu HAN 《Journal of Mathematical Research with Applications》 2025年第3期411-426,共16页
This paper is devoted to the Polynomial Preserving Recovery (PPR) based a posteriori error analysis for the second-order elliptic non-symmetric eigenvalue problem. An asymptotically exact a posteriori error estimator ... This paper is devoted to the Polynomial Preserving Recovery (PPR) based a posteriori error analysis for the second-order elliptic non-symmetric eigenvalue problem. An asymptotically exact a posteriori error estimator is proposed for solving the convection-dominated non-symmetric eigenvalue problem with non-smooth eigenfunctions or multiple eigenvalues. Numerical examples confirm our theoretical analysis. 展开更多
关键词 Polynomial Preserving Recovery non-symmetric eigenvalue problem a posteriori error estimates
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AN ASYMPTOTIC BEHAVIOR AND A POSTERIORI ERROR ESTIMATES FOR THE GENERALIZED SCHWARTZ METHOD OF ADVECTION-DIFFUSION EQUATION
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作者 Salah BOULAARAS Mohammed Said TOUATI BRAHIM +1 位作者 Smail BOUZENADA Abderrahmane ZARAI 《Acta Mathematica Scientia》 SCIE CSCD 2018年第4期1227-1244,共18页
In this paper,a posteriori error estimates for the generalized Schwartz method with Dirichlet boundary conditions on the interfaces for advection-diffusion equation with second order boundary value problems are proved... In this paper,a posteriori error estimates for the generalized Schwartz method with Dirichlet boundary conditions on the interfaces for advection-diffusion equation with second order boundary value problems are proved by using the Euler time scheme combined with Galerkin spatial method.Furthermore,an asymptotic behavior in Sobolev norm is de-duced using Benssoussau-Lions'algorithm.Finally,the results of some numerical experiments are presented to support the theory. 展开更多
关键词 a posteriori error estimates GODDM ADVECTION-DIFFUSION Galerkin method Benssoussan-Lions'algorithm
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A Posteriori Error Estimates for Finite Element Methods for Systems of Nonlinear,Dispersive Equations
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作者 Ohannes A.Karakashian Michael M.Wise 《Communications on Applied Mathematics and Computation》 2022年第3期823-854,共32页
The present study regards the numerical approximation of solutions of systems of Korteweg-de Vries type,coupled through their nonlinear terms.In our previous work[9],we constructed conservative and dissipative finite ... The present study regards the numerical approximation of solutions of systems of Korteweg-de Vries type,coupled through their nonlinear terms.In our previous work[9],we constructed conservative and dissipative finite element methods for these systems and presented a priori error estimates for the semidiscrete schemes.In this sequel,we present a posteriori error estimates for the semidiscrete and fully discrete approximations introduced in[9].The key tool employed to effect our analysis is the dispersive reconstruction devel-oped by Karakashian and Makridakis[20]for related discontinuous Galerkin methods.We conclude by providing a set of numerical experiments designed to validate the a posteriori theory and explore the effectivity of the resulting error indicators. 展开更多
关键词 Finite element methods Discontinuous Galerkin methods Korteweg-de Vries equation A posteriori error estimates Conservation laws Nonlinear equations Dispersive equations
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A Priori and A Posteriori Error Estimates of Streamline Diffusion Finite Element Method for Optimal Control Problem Governed by Convection Dominated Diffusion Equation 被引量:5
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作者 Ningning Yan Zhaojie Zhou 《Numerical Mathematics(Theory,Methods and Applications)》 SCIE 2008年第3期297-320,共24页
In this paper,we investigate a streamline diffusion finite element approxi- mation scheme for the constrained optimal control problem governed by linear con- vection dominated diffusion equations.We prove the existenc... In this paper,we investigate a streamline diffusion finite element approxi- mation scheme for the constrained optimal control problem governed by linear con- vection dominated diffusion equations.We prove the existence and uniqueness of the discretized scheme.Then a priori and a posteriori error estimates are derived for the state,the co-state and the control.Three numerical examples are presented to illustrate our theoretical results. 展开更多
关键词 Constrained optimal control problem convection dominated diffusion equation stream-line diffusion finite element method a priori error estimate a posteriori error estimate.
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A POSTERIORI ERROR ESTIMATES OF THE WEAK GALERKIN FINITE ELEMENT METHOD FOR POISSON-NERNST-PLANCK EQUATIONS
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作者 Wanwan Zhu Guanghua Ji 《Journal of Computational Mathematics》 2026年第2期349-368,共20页
In this paper,we present a posteriori error estimates of the weak Galerkin finite element method for the steady-state Poisson-Nernst-Planck equations.The a posteriori error estimators for the electrostatic potential a... In this paper,we present a posteriori error estimates of the weak Galerkin finite element method for the steady-state Poisson-Nernst-Planck equations.The a posteriori error estimators for the electrostatic potential and ion concentrations are constructed.The reliability and efficiency of the estimators are verified by the upper and lower bounds of the energy norm of the error.The a posteriori error estimators are applied to the adaptive weak Galerkin algorithm for triangle,quadrilateral and polygonal meshes with hanging nodes.Finally,numerical results demonstrate the effectiveness of the adaptive algorithm guided by our constructed estimators. 展开更多
关键词 A posteriori error estimate Weak Galerkin finite element method Poisson-Nernst-Planck equations Adaptive weak Galerkin algorithm Polygonal meshes
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RECONSTRUCTION-BASED A POSTERIORI ERROR ESTIMATES FOR THE L1 METHOD FOR TIME FRACTIONAL PARABOLIC PROBLEMS
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作者 Jiliang Cao Aiguo Xiao Wansheng Wang 《Journal of Computational Mathematics》 2025年第2期345-368,共24页
In this paper,we study a posteriori error estimates of the L1 scheme for time discretizations of time fractional parabolic differential equations,whose solutions have generally the initial singularity.To derive optima... In this paper,we study a posteriori error estimates of the L1 scheme for time discretizations of time fractional parabolic differential equations,whose solutions have generally the initial singularity.To derive optimal order a posteriori error estimates,the quadratic reconstruction for the L1 method and the necessary fractional integral reconstruction for the first-step integration are introduced.By using these continuous,piecewise time reconstructions,the upper and lower error bounds depending only on the discretization parameters and the data of the problems are derived.Various numerical experiments for the one-dimensional linear fractional parabolic equations with smooth or nonsmooth exact solution are used to verify and complement our theoretical results,with the convergence ofαorder for the nonsmooth case on a uniform mesh.To recover the optimal convergence order 2-αon a nonuniform mesh,we further develop a time adaptive algorithm by means of barrier function recently introduced.The numerical implementations are performed on nonsmooth case again and verify that the true error and a posteriori error can achieve the optimal convergence order in adaptive mesh. 展开更多
关键词 Time fractional parabolic differential equations A posteriori error estimates Ll method Fractional integral reconstruction Quadratic reconstruction
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A posteriori error estimates of spectral method for optimal control problems governed by parabolic equations 被引量:7
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作者 CHEN YanPing HUANG YunQing YI NianYu 《Science China Mathematics》 SCIE 2008年第8期1376-1390,共15页
In this paper,we investigate the Legendre Galerkin spectral approximation of quadratic optimal control problems governed by parabolic equations.A spectral approximation scheme for the parabolic optimal control problem... In this paper,we investigate the Legendre Galerkin spectral approximation of quadratic optimal control problems governed by parabolic equations.A spectral approximation scheme for the parabolic optimal control problem is presented.We obtain a posteriori error estimates of the approximated solutions for both the state and the control. 展开更多
关键词 Legendre Galerkin spectral method optimal control problems parabolic state equations a posteriori error estimates 49J20 65M60 65M70
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A POSTERIORI ERROR ESTIMATES FOR FINITE ELEMENT APPROXIMATIONS OF THE CAHN-HILLIARD EQUATION AND THE HELE-SHAW FLOW 被引量:3
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作者 Xiaobing Feng Haijun Wu 《Journal of Computational Mathematics》 SCIE CSCD 2008年第6期767-796,共30页
This paper develops a posteriori error estimates of residual type for conforming and mixed finite element approximations of the fourth order Cahn-Hilliard equation ut + △(ε△Au-ε^-1f(u)) = 0. It is shown that ... This paper develops a posteriori error estimates of residual type for conforming and mixed finite element approximations of the fourth order Cahn-Hilliard equation ut + △(ε△Au-ε^-1f(u)) = 0. It is shown that the a posteriori error bounds depends on ε^-1 only in some low polynomial order, instead of exponential order. Using these a posteriori error estimates, we construct at2 adaptive algorithm for computing the solution of the Cahn- Hilliard equation and its sharp interface limit, the Hele-Shaw flow. Numerical experiments are presented to show the robustness and effectiveness of the new error estimators and the proposed adaptive algorithm. 展开更多
关键词 Cahn-Hilliard equation Hele-Shaw flow Phase transition Conforming elements Mixed finite element methods A posteriori error estimates Adaptivity.
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SUPERCONVERGENCE AND A POSTERIORI ERROR ESTIMATES FOR BOUNDARY CONTROL GOVERNED BY STOKES EQUATIONS 被引量:2
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作者 Hui-po Liu Ning-ning Yan 《Journal of Computational Mathematics》 SCIE EI CSCD 2006年第3期343-356,共14页
In this paper, the superconvergence results are derived for a class of boundary control problems governed by Stokes equations. We derive superconvergence results for both the control and the state approximation. Base ... In this paper, the superconvergence results are derived for a class of boundary control problems governed by Stokes equations. We derive superconvergence results for both the control and the state approximation. Base on superconvergence results, we obtain asymptotically exact a posteriori error estimates. 展开更多
关键词 Boundary control Finite element method SUPERCONVERGENCE A posteriori error estimates.
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A Posteriori Error Estimates of the Galerkin Spectral Methods for Space-Time Fractional Diffusion Equations 被引量:4
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作者 Huasheng Wang Yanping Chen +1 位作者 Yunqing Huang Wenting Mao 《Advances in Applied Mathematics and Mechanics》 SCIE 2020年第1期87-100,共14页
In this paper,an initial boundary value problem of the space-time fractional diffusion equation is studied.Both temporal and spatial directions for this equation are discreted by the Galerkin spectral methods.And then... In this paper,an initial boundary value problem of the space-time fractional diffusion equation is studied.Both temporal and spatial directions for this equation are discreted by the Galerkin spectral methods.And then based on the discretization scheme,reliable a posteriori error estimates for the spectral approximation are derived.Some numerical examples are presented to verify the validity and applicability of the derived a posteriori error estimator. 展开更多
关键词 Galerkin spectral methods space-time fractional diffusion equations a posteriori error estimates.
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ELLIPTIC RECONSTRUCTION AND A POSTERIORI ERROR ESTIMATES FOR FULLY DISCRETE SEMILINEAR PARABOLIC OPTIMAL CONTROL PROBLEMS
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作者 Ram Manohar Rajen Kumar Sinha 《Journal of Computational Mathematics》 SCIE CSCD 2022年第2期147-176,共30页
This article studies a posteriori error analysis of fully discrete finite element approximations for semilinear parabolic optimal control problems.Based on elliptic reconstruction approach introduced earlier by Makrid... This article studies a posteriori error analysis of fully discrete finite element approximations for semilinear parabolic optimal control problems.Based on elliptic reconstruction approach introduced earlier by Makridakis and Nochetto[25],a residual based a posteriori error estimators for the state,co-state and control variables are derived.The space discretization of the state and co-state variables is done by using the piecewise linear and continuous finite elements,whereas the piecewise constant functions are employed for the control variable.The temporal discretization is based on the backward Euler method.We derive a posteriori error estimates for the state,co-state and control variables in the L^(∞)(0,T;L^(2)(Ω))-norm.Finally,a numerical experiment is performed to illustrate the performance of the derived estimators. 展开更多
关键词 Semilinear parabolic optimal control problem Finite element method The backward Euler method Elliptic reconstruction A posteriori error estimates
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The A Priori and A Posteriori Error Estimates for Modified Interior Transmission Eigenvalue Problem in Inverse Scattering
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作者 Yanjun Li Yidu Yang Hai Bi 《Communications in Computational Physics》 SCIE 2023年第7期503-529,共27页
In this paper,we discuss the conforming finite element method for a modified interior transmission eigenvalues problem.We present a complete theoretical analysis for the method,including the a priori and a posteriori ... In this paper,we discuss the conforming finite element method for a modified interior transmission eigenvalues problem.We present a complete theoretical analysis for the method,including the a priori and a posteriori error estimates.The theoretical analysis is conducted under the assumption of low regularity on the solution.We prove the reliability and efficiency of the a posteriori error estimators for eigenfunctions up to higher order terms,and we also analyze the reliability of estimators for eigenvalues.Finally,we report numerical experiments to show that our posteriori error estimator is effective and the approximations can reach the optimal convergence order.The numerical results also indicate that the conforming finite element eigenvalues approximate the exact ones from below,and there exists a monotonic relationship between the conforming finite element eigenvalues and the refractive index through numerical experiments. 展开更多
关键词 Modified interior transmission eigenvalues a priori error estimates a posteriori error estimates adaptive algorithm
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A Posteriori Error Estimates of Triangular Mixed Finite Element Methods for Semilinear Optimal Control Problems
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作者 Zuliang Lu Yanping Chen 《Advances in Applied Mathematics and Mechanics》 SCIE 2009年第2期242-256,共15页
In this paper,we present an a posteriori error estimates of semilinear quadratic constrained optimal control problems using triangular mixed finite element methods.The state and co-state are approximated by the orde... In this paper,we present an a posteriori error estimates of semilinear quadratic constrained optimal control problems using triangular mixed finite element methods.The state and co-state are approximated by the order k≤1 RaviartThomas mixed finite element spaces and the control is approximated by piecewise constant element.We derive a posteriori error estimates for the coupled state and control approximations.A numerical example is presented in confirmation of the theory. 展开更多
关键词 Semilinear optimal control problems mixed finite element methods a posteriori error estimates
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Residual-based a posteriori error estimates of nonconforming finite element method for elliptic problems with Dirac delta source terms 被引量:4
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作者 DU ShaoHong XIE XiaoPing 《Science China Mathematics》 SCIE 2008年第8期1440-1460,共21页
Two residual-based a posteriori error estimators of the nonconforming Crouzeix-Raviart element are derived for elliptic problems with Dirac delta source terms.One estimator is shown to be reliable and efficient,which ... Two residual-based a posteriori error estimators of the nonconforming Crouzeix-Raviart element are derived for elliptic problems with Dirac delta source terms.One estimator is shown to be reliable and efficient,which yields global upper and lower bounds for the error in piecewise W1,p seminorm.The other one is proved to give a global upper bound of the error in Lp-norm.By taking the two estimators as refinement indicators,adaptive algorithms are suggested,which are experimentally shown to attain optimal convergence orders. 展开更多
关键词 Crouzeix-Raviart element nonconforming FEM a posteriori error estimator longest edge bisection 65N15 65N30 65N50
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A Posteriori Error Estimates for Conservative Local Discontinuous Galerkin Methods for the Generalized Korteweg-de Vries Equation 被引量:4
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作者 Ohannes Karakashian Yulong Xing 《Communications in Computational Physics》 SCIE 2016年第6期250-278,共29页
We construct and analyze conservative local discontinuous Galerkin(LDG)methods for the Generalized Korteweg-de-Vries equation.LDG methods are designed by writing the equation as a system and performing separate approx... We construct and analyze conservative local discontinuous Galerkin(LDG)methods for the Generalized Korteweg-de-Vries equation.LDG methods are designed by writing the equation as a system and performing separate approximations to the spatial derivatives.The main focus is on the development of conservative methods which can preserve discrete versions of the first two invariants of the continuous solution,and a posteriori error estimates for a fully discrete approximation that is based on the idea of dispersive reconstruction.Numerical experiments are provided to verify the theoretical estimates. 展开更多
关键词 Discontinuous Galerkin methods Korteweg-de-Vries equation a posteriori error estimate conservative methods
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Gradient Recovery-Type a Posteriori Error Estimates for Steady-State Poisson-Nernst-Planck Equations 被引量:2
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作者 Ruigang Shen Shi Shu +1 位作者 Ying Yang Mingjuan Fang 《Advances in Applied Mathematics and Mechanics》 SCIE 2020年第6期1353-1383,共31页
In this article,we derive the a posteriori error estimators for a class of steadystate Poisson-Nernst-Planck equations.Using the gradient recovery operator,the upper and lower bounds of the a posteriori error estimato... In this article,we derive the a posteriori error estimators for a class of steadystate Poisson-Nernst-Planck equations.Using the gradient recovery operator,the upper and lower bounds of the a posteriori error estimators are established both for the electrostatic potential and concentrations.It is shown by theory and numerical experiments that the error estimators are reliable and the associated adaptive computation is efficient for the steady-state PNP systems. 展开更多
关键词 Poisson-Nernst-Planck equations gradient recovery a posteriori error estimate
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OPTIMAL A POSTERIORI ERROR ESTIMATES OF THE LOCAL DISCONTINUOUS GALERKIN METHOD FOR CONVECTION- DIFFUSION PROBLEMS IN ONE SPACE DIMENSION 被引量:1
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作者 Mahboub Baccouch 《Journal of Computational Mathematics》 SCIE CSCD 2016年第5期511-531,共21页
In this paper, we derive optimal order a posteriori error estimates for the local dis- continuous Galerkin (LDC) method for linear convection-diffusion problems in one space dimension. One of the key ingredients in ... In this paper, we derive optimal order a posteriori error estimates for the local dis- continuous Galerkin (LDC) method for linear convection-diffusion problems in one space dimension. One of the key ingredients in our analysis is the recent optimal superconver- gence result in [Y. Yang and C.-W. Shu, J. Comp. Math., 33 (2015), pp. 323-340]. We first prove that the LDG solution and its spatial derivative, respectively, converge in the L2-norm to (p + 1)-degree right and left Radau interpolating polynomials under mesh re- finement. The order of convergence is proved to be p + 2, when piecewise polynomials of degree at most p are used. These results are used to show that the leading error terms on each element for the solution and its derivative are proportional to (p + 1)-degree right and left Radau polynomials. We further prove that, for smooth solutions, the a posteriori LDG error estimates, which were constructed by the author in an earlier paper, converge, at a fixed time, to the true spatial errors in the L2-norm at (.9(hp+2) rate. Finally, we prove that the global effectivity indices in the L2-norm converge to unity at (9(h) rate. These results improve upon our previously published work in which the order of convergence for the a posteriori error estimates and the global effectivity index are proved to be p+3/2 and 1/2, respectively. Our proofs are valid for arbitrary regular meshes using PP polynomials with p ≥ 1. Several numerical experiments are performed to validate the theoretical results. 展开更多
关键词 Local discontinuous Galerkin method Convection-diffusion problems Super-convergence Radau polynomials A posteriori error estimation.
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A PRIORI AND A POSTERIORI ERROR ESTIMATES OF A WEAKLY OVER-PENALIZED INTERIOR PENALTY METHOD FOR NON-SELF-ADJOINT AND INDEFINITE PROBLEMS 被引量:1
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作者 Yuping Zeng Jinru Chen +1 位作者 Feng Wang Yanxia Meng 《Journal of Computational Mathematics》 SCIE CSCD 2014年第3期332-347,共16页
In this paper, we study a weakly over-penalized interior penalty method for non-self- adjoint and indefinite problems. An optimal a priori error estimate in the energy norm is derived. In addition, we introduce a resi... In this paper, we study a weakly over-penalized interior penalty method for non-self- adjoint and indefinite problems. An optimal a priori error estimate in the energy norm is derived. In addition, we introduce a residual-based a posteriori error estimator, which is proved to be both reliable and efficient in the energy norm. Some numerical testes are presented to validate our theoretical analysis. 展开更多
关键词 Interior penalty method Weakly over-penalization Non-self-adjoint and indefinite A priori error estimate A posteriori error estimate.
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Boundary Integral Equations and A Posteriori Error Estimates
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作者 余德浩 赵龙花 《Tsinghua Science and Technology》 SCIE EI CAS 2005年第1期35-42,共8页
Adaptive methods have been rapidly developed and applied in many fields of scientific and engi- neering computing. Reliable and efficient a posteriori error estimates play key roles for both adaptive finite element ... Adaptive methods have been rapidly developed and applied in many fields of scientific and engi- neering computing. Reliable and efficient a posteriori error estimates play key roles for both adaptive finite element and boundary element methods. The aim of this paper is to develop a posteriori error estimates for boundary element methods. The standard a posteriori error estimates for boundary element methods are obtained from the classical boundary integral equations. This paper presents hyper-singular a posteriori er- ror estimates based on the hyper-singular integral equations. Three kinds of residuals are used as the esti- mates for boundary element errors. The theoretical analysis and numerical examples show that the hyper- singular residuals are good a posteriori error indicators in many adaptive boundary element computations. 展开更多
关键词 boundary integral equation natural boundary reduction a posteriori error estimate hyper- singular residual pseudo-differential operator
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Residual-based a posteriori error estimates for symmetric conforming mixed finite elements for linear elasticity problems
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作者 Long Chen Jun Hu +1 位作者 Xuehai Huang Hongying Man 《Science China Mathematics》 SCIE CSCD 2018年第6期973-992,共20页
A posteriori error estimators for the symmetric mixed finite element methods for linear elasticity problems with Dirichlet and mixed boundary conditions are proposed. Reliability and efficiency of the estimators are p... A posteriori error estimators for the symmetric mixed finite element methods for linear elasticity problems with Dirichlet and mixed boundary conditions are proposed. Reliability and efficiency of the estimators are proved. Numerical examples are presented to verify the theoretical results. 展开更多
关键词 symmetric mixed finite element linear elasticity problems a posteriori error estimator adaptivemethod
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