共查询到20条相似文献,搜索用时 200 毫秒
1.
张新祥 《数学的实践与认识》2012,42(3):163-167
在半离散格式下,研究了一类非线性波动方程的非协调有限元逼近.首先证明了该格式解的存在性和唯一性,给出了稳定性分析和误差分析,其次得到了最优的误差估计. 相似文献
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在半离散和全离散格式下讨论非线性抛物积分微分方程的类Wilson非协调有限元逼近.当问题的精确解u∈H3(Ω)/H4(Ω)时,利用该元的相容误差在能量模意义下可以达到O(h2)/O(h3)比其插值误差高一阶和二阶的特殊性质,再结合协调部分的高精度分析及插值后处理技术,并借助于双线性插值代替传统有限元分析中不可缺少的Ritz-Volterra投影导出了半离散格式下的O(h2)阶超逼近和超收敛结果.同时分别得到了向后Euler全离散格式下的超逼近性和Crank-Nicolson全离散格式下的最优误差估计. 相似文献
3.
基于EQrot1非协调元的两个特殊性质:一是诱导的有限元插值算子与传统的Ritz投影是一致的;二是当所考虑问题的精确解属于H3(Ω)时,其相容误差为O(h2)阶,比插值误差高一阶.本文对非线性Sine-Gordon方程提出一个新的二阶全离散格式,给出收敛性分析和最优阶误差估计.最后,讨论本文的结果对另外一些著名的非协调元的应用. 相似文献
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讨论了一类伪双曲型方程的一个H1-Galerkin非协调混合有限元方法.利用插值算子的特殊性质,在半离散和全离散格式下,得到了与传统混合有限元相同的误差估计且不需要满足LBB条件. 相似文献
6.
双曲型方程的一类各向异性非协调有限元逼近 总被引:8,自引:0,他引:8
在各向异性条件下,讨论了双曲型方程的一类非协调有限元逼近,给出了半离散格式下的最优误差估计.同时通过新的技巧和精细估计得到了一些超逼近性质和超收敛结果. 相似文献
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研究了一类非线性双曲型方程的非协调有限元方法,在不需要传统的Ritz投影的情况下,得到了半离散格式下的误差估计及超收敛结果. 相似文献
9.
本文基于积分守恒性质,应用离散算子方法,给出了三维血吸虫病模型第一齐次边值问题的离散格式,同时证明了数值解的非负性和有界性,较好地体现了这一问题的实际背景,另外给出了最优L~2模误差估计。 相似文献
10.
对非定常线性化Navier-Stokes方程提出了非协调流线扩散有限元方法.用向后Euler格式离散时间,用流线扩散法处理扩散项带来的非稳定性.速度采用不连续的分片线性逼近,压力采用分片常数逼近.得到了离散解的存在唯一性以及在一定范数意义下离散解的稳定性和误差估计. 相似文献
11.
Superconvergence and recovery a posteriori error estimates of the finite element ap- proximation for general convex optimal control problems are investigated in this paper. We obtain the superconvergence properties of finite element solutions, and by using the superconvergence results we get recovery a posteriori error estimates which are asymptotically exact under some regularity conditions. Some numerical examples are provided to verify the theoretical results. 相似文献
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This paper is concerned with recovery type a posteriori error estimates of fully discrete finite element approximation for general convex parabolic optimal control problems with pointwise control constraints. The time discretization is based on the backward Euler method. The state and the adjoint state are approximated by piecewise linear functions and the control is approximated by piecewise constant functions. We derive the superconvergence properties of finite element solutions. By using the superconvergence results, we obtain recovery type a posteriori error estimates. Some numerical examples are presented to verify the theoretical results. 相似文献
13.
SUPERAPPROXIMATION PROPERTIES OF THE INTERPOLATION OPERATOR OF PROJECTION TYPE AND APPLICATIONS 总被引:1,自引:0,他引:1
Tie Zhang 《计算数学(英文版)》2002,(3)
AbstractSome superapproximation and ultra-approximation properties in function, gradient and two-order derivative approximations are shown for the interpolation operator of projection type on two-dimensional domain. Then, we consider the Ritz projection and Ritz-Volterra projection on finite element spaces, and by means of the superapproximation elementary estimates and Green function methods, derive the superconvergence and ultraconvergence error estimates for both projections, which are also the finite element approximation solutions of the elliptic problems and the Sobolev equations, respectively. 相似文献
14.
运用七种两重网格协调元方法得出了不可压Navier-Stokes方程流函数形式的残量型后验误差估计.对比标准有限元方法的后验误差估计,两重网格算法的后验误差估计多了一些额外项(三线性项).说明了这些额外项在误差估计中对研究离散解渐近性的重要性,推出了对于最优网格尺寸,这些额外项的收敛阶不高于标准离散解的收敛阶. 相似文献
15.
N. Yu. Bakaev 《BIT Numerical Mathematics》1997,37(2):237-255
The maximum norm error estimates of the Galerkin finite element approximations to the solutions of differential and integro-differential
multi-dimensional parabolic problems are considered. Our method is based on the use of the discrete version of the elliptic-Sobolev
inequality and some operator representations of the finite element solutions. The results of the present paper lead to the
error estimates of optimal or almost optimal order for the case of simplicial Lagrangian piecewise polynomial elements. 相似文献
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We derive new a priori error estimates for linear parabolic equations with discontinuous coefficients. Due to low global regularity of the solutions the error analysis of the standard finite element method for parabolic problems is difficult to adopt for parabolic interface problems. A finite element procedure is, therefore, proposed and analyzed in this paper. We are able to show that the standard energy technique of finite element method for non-interface parabolic problems can be extended to parabolic interface problems if we allow interface triangles to be curved triangles. Optimal pointwise-in-time error estimates in the L 2(Ω) and H 1(Ω) norms are shown to hold for the semidiscrete scheme. A fully discrete scheme based on backward Euler method is analyzed and pointwise-in-time error estimates are derived. The interfaces are assumed to be arbitrary shape but smooth for our purpose. 相似文献
18.
本文利用基于重心对偶剖分的有限体积元法建立了二维非饱和土壤水分运动问题的数值逼近格式,讨论了离散有限体积元解的存在唯一性,并给出了最优误差估计的证明.最后给出数值算例,模拟结果表明,利用有限体积元格式来求解二维非饱和土壤水分运动问题是可靠的,且该格式具有稳定性和可实用性. 相似文献
19.
Summary. In this paper, we derive quasi-norm a priori and a posteriori error estimates for the Crouzeix-Raviart type finite element
approximation of the p-Laplacian. Sharper a priori upper error bounds are obtained. For instance, for sufficiently regular
solutions we prove optimal a priori error bounds on the discretization error in an energy norm when . We also show that the new a posteriori error estimates provide improved upper and lower bounds on the discretization error.
For sufficiently regular solutions, the a posteriori error estimates are further shown to be equivalent on the discretization
error in a quasi-norm.
Received January 25, 1999 / Revised version received June 5, 2000 Published online March 20, 2001 相似文献
20.
江成顺 《高校应用数学学报(英文版)》1999,14(4)
This paper studies the finite element method for some nonlinear hyperbolic partial differential equations with memory and dampling terms.A Crank-Nicolson approximation for this kind of equations is presented.By using the elliptic Ritz-Volterra projection,the analysis of the error estimates for the finite element numerical solutions and the optimal H1-norm error estimate are demonstrated. 相似文献