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本文对有限元和直接积分法瞬态动力计算的时空离散协调问题进行了研究,本文分别分析了空间离散和时间离散所引起的数值误差,提出了均衡空间离散引起的能量误差和时间离散引起的能量误差的原则,并给出时空离散协调的前处理方案和自适应方案。 相似文献
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复杂系统的离散质量生存决策 总被引:2,自引:0,他引:2
在复杂系统的质量生存交互决策中,引入了最大质量生存函数W*的概念.为得到W*的数值计算方法,本文系统地研究了离散质量生存(交互)决策和最大离散质量生存函数,推导出最大离散质量生存函数的递归算法,最后用离散算法获得最大Q-生存函数W*的两类离散近似解:有限近似离散近似解和加厚法离散近似解,并给出近似解的收敛性证明. 相似文献
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本文给出了数值求解非线性发展方程的全离散非线性Galerkin算法,即将空间离散时的谱非线性Galerkin算法和时间离散的Euler差分格式相结合,得到了显式和隐式两种全离散数值格式,相应地也考虑了显式和隐式的Galerkin全离散格式,并分别分析了上述四种全离散格式的收敛性和复杂性,经过比较得出结论;在某些约束条件下,非线性Galerkin算法和Galerkin算法具有相同阶的收敛速度,然而前 相似文献
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对离散型随机变量的高阶矩进行了研究,给出了几类离散型随机变量的高阶原点矩的统一递推公式,得到了离散型随机变量的高阶原点矩的形式特征. 相似文献
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有限离散函数的导数和性质 总被引:2,自引:0,他引:2
通过引入有限离散函数的导数概念,分别从几何直观和性质两个角度,比较了有限离散函数的导数概念和常规连续函数导数的相似性.结果表明,在局部情况下,有限离散函数导数近似等于连续情形下的导数.在运算性质上,有限离散函数导数的性质非常相似于连续情形时的导数性质.最后的例子给出了有限离散函数导数的一个应用. 相似文献
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研究了指数有界的m次积分半群的离散逼近问题,利用可积的离散参数半群,获得了相关离散逼近结果.另外,给出了该逼近理论在非齐次抽象Cauchy问题中的应用. 相似文献
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ABSTRACTInstead of using the full polynomial space, a conforming and a nonconforming finite element methods are designed where only harmonic polynomials (a much smaller space) are employed in the computation. The conforming quadratic harmonic polynomial finite element is defined only on a special triangular grid. The nonconforming quadratic harmonic finite element is defined on general triangular grids. The optimal order of convergence is proved for both finite element methods, and confirmed by numerical computations. In addition, numerical comparisons with the standard conforming and nonconforming finite elements are presented. 相似文献
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Mohamed Farhloul And Michel Fortin 《Numerical Methods for Partial Differential Equations》1997,13(5):445-457
In a recent work, Hiptmair [Mathematisches Institut, M9404, 1994] has constructed and analyzed a family of nonconforming mixed finite elements for second-order elliptic problems. However, his analysis does not work on the lowest order elements. In this article, we show that it is possible to construct a nonconforming mixed finite element for the lowest order case. We prove the convergence and give estimates of optimal order for this finite element. Our proof is based on the use of the properties of the so-called nonconforming bubble function to control the consistency terms introduced by the nonconforming approximation. We further establish an equivalence between this mixed finite element and the nonconforming piecewise quadratic finite element of Fortin and Soulie [J. Numer. Methods Eng., 19, 505–520, 1983]. © 1997 John Wiley & Sons, Inc. Numer Methods Partial Differential Eq 13: 445–457, 1997 相似文献
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In this paper, a multilevel correction scheme is proposed to solve the Steklov eigenvalue problem by nonconforming finite element methods. With this new scheme, the accuracy of eigenpair approximations can be improved after each correction step which only needs to solve a source problem on finer finite element space and an Steklov eigenvalue problem on the coarsest finite element space. This correction scheme can increase the overall efficiency of solving eigenvalue problems by the nonconforming finite element method. Furthermore, as same as the direct eigenvalue solving by nonconforming finite element methods, this multilevel correction method can also produce the lower-bound approximations of the eigenvalues. 相似文献
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The a posteriori error analysis of conforming finite element discretisations of the biharmonic problem for plates is well established, but nonconforming discretisations are more easy to implement in practice. The a posteriori error analysis for the Morley plate element appears very particular because two edge contributions from an integration by parts vanish simultaneously. This crucial property is lacking for popular rectangular nonconforming finite element schemes like the nonconforming rectangular Morley finite element, the incomplete biquadratic finite element, and the Adini finite element. This paper introduces a novel methodology and utilises some conforming discrete space on macro elements to prove reliability and efficiency of an explicit residual-based a posteriori error estimator. An application to the Morley triangular finite element shows the surprising result that all averaging techniques yield reliable error bounds. Numerical experiments confirm the reliability and efficiency for the established a posteriori error control on uniform and graded tensor-product meshes. 相似文献
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The approach of nonconforming finite element method admits users to solve the partial differential equations with lower complexity,but the accuracy is usually low.In this paper,we present a family of highaccuracy nonconforming finite element methods for fourth order problems in arbitrary dimensions.The finite element methods are given in a unified way with respect to the dimension.This is an effort to reveal the balance between the accuracy and the complexity of finite element methods. 相似文献
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基于非协调元的区域分解法──强重迭情形黄建国(上海交通大学应用数学系)ADOMAINDECOMPOSITIONMETHODFORNONCONFORMINGFINITEELEMENT──THECASEOFSTRONGOVERLAP¥HuangJian... 相似文献
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This paper is devoted to a new error analysis of nonconforming finite element methods.Compared with the classic error analysis in literature,only weak continuity,the F-E-M-Test for nonconforming finite element spaces,and basic Hm regularity for exact solutions of 2m-th order elliptic problems under consideration are assumed.The analysis is motivated by ideas from a posteriori error estimates and projection average operators.One main ingredient is a novel decomposition for some key average terms on(n.1)-dimensional faces by introducing a piecewise constant projection,which defines the generalization to more general nonconforming finite elements of the results in literature.The analysis and results herein are conjectured to apply for all nonconforming finite elements in literature. 相似文献
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An adaptive nonconforming finite element method is developed and analyzed that provides an error reduction due to the refinement
process and thus guarantees convergence of the nonconforming finite element approximations. The analysis is carried out for
the lowest order Crouzeix-Raviart elements and leads to the linear convergence of an appropriate adaptive nonconforming finite
element algorithm with respect to the number of refinement levels. Important tools in the convergence proof are a discrete
local efficiency and a quasi-orthogonality property. The proof does neither require regularity of the solution nor uses duality
arguments. As a consequence on the data control, no particular mesh design has to be monitored.
Supported by the DFG Research Center MATHEON ``Mathematics for key technologies' in Berlin. 相似文献
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Dong-yang Shi Shao-chun Chen Ichiro Hagiwara 《计算数学(英文版)》2005,23(4):373-382
Regular assumption of finite element meshes is a basic condition of most analysis offinite element approximations both for conventional conforming elements and nonconform-ing elements.The aim of this paper is to present a novel approach of dealing with theapproximation of a four-degree nonconforming finite element for the second order ellipticproblems on the anisotropic meshes.The optimal error estimates of energy norm and L~2-norm without the regular assumption or quasi-uniform assumption are obtained based onsome new special features of this element discovered herein.Numerical results are givento demonstrate validity of our theoretical analysis. 相似文献
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The main goal of this paper is to present recovery type a posteriori error estimators and superconvergence for the nonconforming finite element eigenvalue approximation of self-adjoint elliptic equations by projection methods. Based on the superconvergence results of nonconforming finite element for the eigenfunction we derive superconvergence and recovery type a posteriori error estimates of the eigenvalue. The results are based on some regularity assumption for the elliptic problem and are applicable to the lowest order nonconforming finite element approximations of self-adjoint elliptic eigenvalue problems with quasi-regular partitions. Therefore, the results of this paper can be employed to provide useful a posteriori error estimators in practical computing under unstructured meshes. 相似文献