THE SUPERCLOSENESS OF THE FINITE ELEMENT METHOD FOR A SINGULARLY PERTURBED CONVECTION-DIFFUSION PROBLEM ON A BAKHVALOV-TYPE MESH IN 2D

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作者 Chunxiao ZHANG Jin ZHANG 《Acta Mathematica Scientia》 SCIE CSCD 2024年第4期1572-1593,共22页

For singularly perturbed convection-diffusion problems,supercloseness analysis of the finite element method is still open on Bakhvalov-type meshes,especially in the case of 2D.The difficulties arise from the width of ... For singularly perturbed convection-diffusion problems,supercloseness analysis of the finite element method is still open on Bakhvalov-type meshes,especially in the case of 2D.The difficulties arise from the width of the mesh in the layer adjacent to the transition point,resulting in a suboptimal estimate for convergence.Existing analysis techniques cannot handle these difficulties well.To fill this gap,here a novel interpolation is designed delicately for the smooth part of the solution,bringing about the optimal supercloseness result of almost order 2 under an energy norm for the finite element method.Our theoretical result is uniform in the singular perturbation parameterεand is supported by the numerical experiments. 展开更多

关键词 singularly perturbed CONVECTION-DIFFUSION finite element method supercloseNESS Bakhvalov-type mesh

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A New Proof of Superclose of a Crouzeix-Raviart Type Finite Element for Second Order Elliptic Equation

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作者 PENG Yu-cheng SHI Dong-yang 《Chinese Quarterly Journal of Mathematics》 CSCD 北大核心 2007年第4期627-632,共6页

In this paper, a new proof of superclose of a Crouzeix-Raviart type finite element is given for second order elliptic boundary value problem by Bramble-Hilbert lemma on anisotropic meshes.

关键词 Crouzeix-Raviaxt type finite element superclose anisotropic meshes

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ANISOTROPIC BIQUADRATIC ELEMENT WITH SUPERCLOSE RESULT 被引量：8

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作者 Dongyang SHI Shipeng MAO Hui LIANG 《Journal of Systems Science & Complexity》 SCIE EI CSCD 2006年第4期566-576,共11页

The main aim of this paper is to study the convergence of biquadratic finite element tor the second order problem on anisotropic meshes. By using some novel approaches and techniques, the optimal error estimates are o... The main aim of this paper is to study the convergence of biquadratic finite element tor the second order problem on anisotropic meshes. By using some novel approaches and techniques, the optimal error estimates are obtuined. At the same time, the anisotropic superclose results are also achieved. Furthermore, the numerical results are given to demonstrate our theoretical analysis. 展开更多

关键词 ANISOTROPIC optimal error estimates superclose.

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Supercloseness of the Divergence-Free Finite Element Solutions on Rectangular Grids

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作者 Yunqing Huang Shangyou Zhang 《Communications in Mathematics and Statistics》 SCIE 2013年第2期143-162,共20页

By the standard theory,the stable Qk+1,k−Qk,k+1/Qdck divergence-free element converges with the optimal order of approximation for the Stokes equations,but only order k for the velocity in H1-norm and the pressure in... By the standard theory,the stable Qk+1,k−Qk,k+1/Qdck divergence-free element converges with the optimal order of approximation for the Stokes equations,but only order k for the velocity in H1-norm and the pressure in L2-norm.This is due to one polynomial degree less in y direction for the first component of velocity,which is a Qk+1,k polynomial of x and y.In this manuscript,we will show by supercloseness of the divergence free element that the order of convergence is truly k+1,for both velocity and pressure.For special solutions(if the interpolation is also divergence-free),a two-order supercloseness is shown to exist.Numerical tests are provided confirming the accuracy of the theory. 展开更多

关键词 Mixed finite element Stokes equations Divergence-free element Quadrilateral element Rectangular grids supercloseNESS SUPERCONVERGENCE

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Superconvergence analysis of Wilson element on anisotropic meshes 被引量：3

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作者 石东洋 梁慧 《Applied Mathematics and Mechanics(English Edition)》 SCIE EI 2007年第1期119-125,共7页

The Wilson finite element method is considered to solve a class of two- dimensional second order elliptic boundary value problems. By using of the particular structure of the element and some new techniques, we obtain... The Wilson finite element method is considered to solve a class of two- dimensional second order elliptic boundary value problems. By using of the particular structure of the element and some new techniques, we obtain the superclose and global superconvergence on anisotropic meshes. Numerical example is also given to confirm our theoretical analysis. 展开更多

关键词 Anisotropic meshes Wilson element superclose SUPERCONVERGENCE

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High Accuracy Analysis for Nonconforming Mortar Finite Element with a Class of Irregular Meshes 被引量：1

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作者 WU Jing-zhu SHI Dong-yang 《Chinese Quarterly Journal of Mathematics》 CSCD 北大核心 2005年第3期309-318,共10页

In this paper, the nonconforming mortar finite element with a class of meshes is studied without considering the global regularity condition or quasi-uniformly assumption. Meanwhile, the superclose result coincides wi... In this paper, the nonconforming mortar finite element with a class of meshes is studied without considering the global regularity condition or quasi-uniformly assumption. Meanwhile, the superclose result coincides with conventional methods is obtained by means of integral identities techniques. 展开更多

关键词 irregular meshes mortar finite element superclose integral identities

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Anisotropic Biquadratic Finite Element with Some Natural Superconvergence Results

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作者 李清善 孙会霞 《Chinese Quarterly Journal of Mathematics》 CSCD 北大核心 2007年第3期388-394,共7页

The paper studies the convergence and the superconvergence of the biquadratic finite element for Poisson＇ problem on anisotropic meshes. By detailed analysis, it shows that the biquadratic finite element is anisotrop... The paper studies the convergence and the superconvergence of the biquadratic finite element for Poisson＇ problem on anisotropic meshes. By detailed analysis, it shows that the biquadratic finite element is anisotropically superconvergent at four Gauss points in the element. Key words： 展开更多

关键词 ANISOTROPIC biquadratic finite element superclose SUPERCONVERGENCE

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Convergence and Superconvergence of the Local Discontinuous Galerkin Method for Semilinear Second‑Order Elliptic Problems on Cartesian Grids

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作者 Mahboub Baccouch 《Communications on Applied Mathematics and Computation》 2022年第2期437-476,共40页

This paper is concerned with convergence and superconvergence properties of the local discontinuous Galerkin(LDG)method for two-dimensional semilinear second-order elliptic problems of the form−Δu=f(x,y,u)on Cartesia... This paper is concerned with convergence and superconvergence properties of the local discontinuous Galerkin(LDG)method for two-dimensional semilinear second-order elliptic problems of the form−Δu=f(x,y,u)on Cartesian grids.By introducing special GaussRadau projections and using duality arguments,we obtain,under some suitable choice of numerical fuxes,the optimal convergence order in L2-norm of O(h^(p+1))for the LDG solution and its gradient,when tensor product polynomials of degree at most p and grid size h are used.Moreover,we prove that the LDG solutions are superconvergent with an order p+2 toward particular Gauss-Radau projections of the exact solutions.Finally,we show that the error between the gradient of the LDG solution and the gradient of a special Gauss-Radau projection of the exact solution achieves(p+1)-th order superconvergence.Some numerical experiments are performed to illustrate the theoretical results. 展开更多

关键词 Semilinear second-order elliptic boundary-value problems Local discontinuous Galerkin method A priori error estimation Optimal superconvergence supercloseNESS Gauss-Radau projections

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UNIFORM SUPERCONVERGENCE ANALYSIS OF A TWO-GRID MIXED FINITE ELEMENT METHOD FOR THE TIME-DEPENDENT BI-WAVE PROBLEM MODELING D-WAVE SUPERCONDUCTORS

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作者 Yanmi Wu Dongyang Shi 《Journal of Computational Mathematics》 SCIE CSCD 2024年第2期415-431,共17页

In this paper,a two-grid mixed finite element method(MFEM)of implicit Backward Euler(BE)formula is presented for the fourth order time-dependent singularly perturbed Bi-wave problem for d-wave superconductors by the n... In this paper,a two-grid mixed finite element method(MFEM)of implicit Backward Euler(BE)formula is presented for the fourth order time-dependent singularly perturbed Bi-wave problem for d-wave superconductors by the nonconforming EQ_(1)^(rot) element.In this approach,the original nonlinear system is solved on the coarse mesh through the Newton iteration method,and then the linear system is computed on the fine mesh with Taylor’s expansion.Based on the high accuracy results of the chosen element,the uniform superclose and superconvergent estimates in the broken H^(1)-norm are derived,which are independent of the negative powers of the perturbation parameter appeared in the considered problem.Numerical results illustrate that the computing cost of the proposed two-grid method is much less than that of the conventional Galerkin MFEM without loss of accuracy. 展开更多

关键词 Time-dependent Bi-wave problem Two-grid mixed finite element method Uniform superclose and superconvergent estimates

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THE SUPERCONVERGENCE ANALYSIS OF AN ANISOTROPIC FINITE ELEMENT 被引量：32

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作者 SHI Dongyang ZHU Huiqing 《Journal of Systems Science & Complexity》 SCIE EI CSCD 2005年第4期478-487,共10页

This paper deals with the high accuracy analysis of bilinear finite element on the class of anisotropic rectangular meshes. The inverse inequalities on anisotropic meshes are established. The superclose and the superc... This paper deals with the high accuracy analysis of bilinear finite element on the class of anisotropic rectangular meshes. The inverse inequalities on anisotropic meshes are established. The superclose and the superconvergence are obtained for the second order elliptic problem. A numerical test is given, which coincides with our theoretical analysis. 展开更多

关键词 bilinear finite element superclose SUPERCONVERGENCE anisotropic meshes high accuracy

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AN ANISOTROPIC NONCONFORMING FINITE ELEMENT METHOD FOR APPROXIMATING A CLASS OF NONLINEAR SOBOLEV EQUATIONS 被引量：50

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作者 Dongyang Shi Haihong Wang Yuepeng Du 《Journal of Computational Mathematics》 SCIE CSCD 2009年第2期299-314,共16页

An anisotropic nonconforming finite element method is presented for a class of nonlinear Sobolev equations. The optimal error estimates and supercloseness are obtained for both semi-discrete and fully-discrete approxi... An anisotropic nonconforming finite element method is presented for a class of nonlinear Sobolev equations. The optimal error estimates and supercloseness are obtained for both semi-discrete and fully-discrete approximate schemes, which are the same as the traditional finite element methods. In addition, the global superconvergence is derived through the postprocessing technique. Numerical experiments are included to illustrate the feasibility of the proposed method. 展开更多

关键词 Nonlinear Sobolev equations ANISOTROPIC Nonconforming finite element supercloseNESS Global superconvergence.

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Superconvergence Analysis and Extrapolation of Quasi-Wilson Nonconforming Finite Element Method for Nonlinear Sobolev Equations 被引量：22

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作者 Dong-yang SHI Fen-ling WANG Yan-min ZHAO 《Acta Mathematicae Applicatae Sinica》 SCIE CSCD 2013年第2期403-414,共12页

Quasi-Wilson nonconforming finite element approximation for a class of nonlinear Sobolev equa- tions is discussed on rectangular meshes. We first prove that this element has two special characters by novel approaches.... Quasi-Wilson nonconforming finite element approximation for a class of nonlinear Sobolev equa- tions is discussed on rectangular meshes. We first prove that this element has two special characters by novel approaches. One is that （Vh（U -- Ihu）,VhVh）h may be estimated as order O（h2） when u E H3（Ω）, where Iuu denotes the bilinear interpolation of u, vh is a polynomial belongs to quasi-Wilson finite element space and △h denotes the piecewise defined gradient operator, h is the mesh size tending to zero. The other is that the consistency error of this element is of order O（h2）/O（h3） in broken Hi-norm, which is one/two order higher than its interpolation error when u ε Ha（Ω）/H4 （（1）. Then we derive the optimal order error estimate and su- perclose property via mean-value method and the known high accuracy result of bilinear element. Furthermore, we deduce the global superconvergence through interpolation post processing technique. At last, an extrapola- tion result of order O（h3）, two order higher than traditional error estimate, is obtained by constructing a new suitable extrapolation scheme. 展开更多

关键词 nonlinear Sobolev equations quasi-Wilson element superclose and superconvergence extrapola-tion

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APPROXIMATION OF NONCONFORMING QUASI-WILSON ELEMENT FOR SINE-GORDON EQUATIONS 被引量：16

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作者 Dongyang Shi Ding Zhang 《Journal of Computational Mathematics》 SCIE CSCD 2013年第3期271-282,共12页

In this paper, nonconforming quasi-Wilson finite element approximation to a class of nonlinear sine-Gordan equations is discussed. Based on the known higher accuracy results of bilinear element and different technique... In this paper, nonconforming quasi-Wilson finite element approximation to a class of nonlinear sine-Gordan equations is discussed. Based on the known higher accuracy results of bilinear element and different techniques from the existing literature, it is proved that the inner product △↓（u - Ih^1u）, △↓vh） and the consistency error can be estimated as order O（h^2） in broken H^1 - norm/L^2 - norm when u ∈ H^3（Ω）/H^4（Ω）, where Ih^1u is the bilinear interpolation of u, Vh belongs to the quasi-Wilson finite element space. At the same time, the superclose result with order O（h^2） for semi-discrete scheme under generalized rectangular meshes is derived. Furthermore, a fully-discrete scheme is proposed and the corresponding error estimate of order O（h^2 ＋ τ^2） is obtained for the rectangular partition when u ∈ H^4（Ω）, which is as same as that of the bilinear element with ADI scheme and one order higher than that of the usual analysis on nonconforming finite elements. 展开更多

关键词 Sine-Gordon equations Quasi-Wilson element Semi-discrete and fully-discrete schemes Error estimate and superclose result.

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SUPERCONVERGENCE ANALYSIS OF A NONCONFORMING TRIANGULAR ELEMENT ON ANISOTROPIC MESHES 被引量：8

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作者 Dongyang SHI Hui LIANG Caixia WANG 《Journal of Systems Science & Complexity》 SCIE EI CSCD 2007年第4期536-544,共9页

The class of anisotropic meshes we conceived abandons the regular assumption. Some distinct properties of Carey＇s element are used to deal with the superconvergence for a class of two- dimensional second-order ellipt... The class of anisotropic meshes we conceived abandons the regular assumption. Some distinct properties of Carey＇s element are used to deal with the superconvergence for a class of two- dimensional second-order elliptic boundary value problems on anisotropic meshes. The optimal results are obtained and numerical examples are given to confirm our theoretical analysis. 展开更多

关键词 Anisotropic meshes Carey＇s element NONCONFORMING superclose superconvergence.

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SUPERCONVERGENCE ANALYSIS OF THE STABLE CONFORMING RECTANGULAR MIXED FINITE ELEMENTS FOR THE LINEAR ELASTICITY PROBLEM 被引量：15

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作者 Dongyang Shi Minghao Li 《Journal of Computational Mathematics》 SCIE CSCD 2014年第2期205-214,共10页

In this paper, we consider the linear elasticity problem based on the Hellinger-Reissner variational principle. An O（h2） order superclose property for the stress and displacement and a global superconvergence result... In this paper, we consider the linear elasticity problem based on the Hellinger-Reissner variational principle. An O（h2） order superclose property for the stress and displacement and a global superconvergence result of the displacement are established by employing a Clement interpolation, an integral identity and appropriate postprocessing techniques. 展开更多

关键词 ELASTICITY supercloseNESS Global superconvergence.

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HIGH ACCURACY ANALYSIS OF THE FINITE ELEMENT METHOD FOR NONLINEAR VISCOELASTIC WAVE EQUATIONS WITH NONLINEAR BOUNDARY CONDITIONS 被引量：9

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作者 Dongyang SHI Buying ZHANG 《Journal of Systems Science & Complexity》 SCIE EI CSCD 2011年第4期795-802,共8页

The standard finite elements of degree p over the rectangular meshes are applied to solve a kind of nonlinear viscoelastic wave equations with nonlinear boundary conditions, and the superclose property of the continuo... The standard finite elements of degree p over the rectangular meshes are applied to solve a kind of nonlinear viscoelastic wave equations with nonlinear boundary conditions, and the superclose property of the continuous Galerkin approximation is derived without using the nonclassical elliptic projection of the exact solution of the model problem. The global superconvergence of one order higher than the traditional error estimate is also obtained through the postprocessing technique. 展开更多

关键词 Nonlinear boundary conditions nonlinear viscoelastic wave equations postprocessingoperator superclose and superconvergence.

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EQ^(rot)_1 Nonconforming Finite Element Method for Nonlinear Dual Phase Lagging Heat Conduction Equations 被引量：6

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作者 Yan-min Zhao Fen-ling Wang Dong-yang Shi 《Acta Mathematicae Applicatae Sinica》 SCIE CSCD 2013年第1期201-214,共14页

EQrot nonconforming finite element approximation to a class of nonlinear dual phase lagging heat conduction equations is discussed for semi-discrete and fully-discrete schemes. By use of a special property, that is, t... EQrot nonconforming finite element approximation to a class of nonlinear dual phase lagging heat conduction equations is discussed for semi-discrete and fully-discrete schemes. By use of a special property, that is, the consistency error of this element is of order O（h2） one order higher than its interpolation error O（h）, the superclose results of order O（h2） in broken Hi-norm are obtained. At the same time, the global superconvergence in broken Hi-norm is deduced by interpolation postprocessing technique. Moreover, the extrapolation result with order O（h4） is derived by constructing a new interpolation postprocessing operator and extrapolation scheme based on the known asymptotic expansion formulas of EQrot element. Finally, optimal error estimate is gained for a proposed fully-discrete scheme by different approaches from the previous literature. 展开更多

关键词 nonlinear dual phase lagging heat conduction equations EQrot nonconforming finite element superclose and superconvergence EXTRAPOLATION semi-discrete and fully-discrete schemes

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Superconvergence Analysis of Splitting Positive Definite Nonconforming Mixed Finite Element Method for Pseudo-hyperbolic Equations 被引量：7

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作者 Dong-yang SHI Qi-li TANG 《Acta Mathematicae Applicatae Sinica》 SCIE CSCD 2013年第4期843-854,共12页

In this paper, a new splitting positive definite nonconforming mixed finite element method is proposed for pseudo-hyperbolic equations, in which a quasi-Wilson quadrilateral element is used for the flux p, and the bil... In this paper, a new splitting positive definite nonconforming mixed finite element method is proposed for pseudo-hyperbolic equations, in which a quasi-Wilson quadrilateral element is used for the flux p, and the bilinear element is used for u. Superconvergence results in ｜｜·｜｜div,h norm for p and optimal error estimates in L2 norm for u are derived for both semi-discrete and fully discrete schemes under almost uniform meshes. 展开更多

关键词 pseudo-hyperbolic equations splitting positive definite nonconforming mixed finite element method superclose SUPERCONVERGENCE

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A LOW ORDER NONCONFORMING ANISOTROPIC FINITE ELEMENT APPROXIMATION TO PARABOLIC PROBLEM 被引量：3

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作者 Dongyang SHI Wei GONG 《Journal of Systems Science & Complexity》 SCIE EI CSCD 2009年第3期518-532,共15页

A low order nonconforming finite element is applied to the parabolic problem with anisotropicmeshes.Both the semidiscrete and fully discrete forms are studied.Some superclose properties andsuperconvergence are obtaine... A low order nonconforming finite element is applied to the parabolic problem with anisotropicmeshes.Both the semidiscrete and fully discrete forms are studied.Some superclose properties andsuperconvergence are obtained through some novel approaches and techniques. 展开更多

关键词 Anisotropic meshes nonconforming element parabolic problem superclose superconveygence.

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LOCAL SUPERCONVERGENCE OF CONTINUOUS GALERKIN SOLUTIONS FOR DELAY DIFFERENTIAL EQUATIONS OF PANTOGRAPH TYPE 被引量：3

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作者 Xiuxiu Xu Qiumei Huang Hongtao Chen 《Journal of Computational Mathematics》 SCIE CSCD 2016年第2期186-199,共14页

This paper is concerned with the superconvergent points of the continuous Galerkin solutions for delay differential equations of pantograph type. We prove the local nodal superconvergence of continuous Galerkin soluti... This paper is concerned with the superconvergent points of the continuous Galerkin solutions for delay differential equations of pantograph type. We prove the local nodal superconvergence of continuous Galerkin solutions under uniform meshes and locate all the superconvergent points based on the supercloseness between the continuous Galerkin solution U and the interpolation Hhu of the exact solution u. The theoretical results are illustrated by numerical examples. 展开更多

关键词 Pantograph delay differential equations Uniform mesh Continuous Galerkinmethods supercloseNESS Superconvergence.

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