美式回望期权定价的有限元超收敛分析

考虑美式回望看跌期权的有限元方法．在把原问题转化成等价的变分不等式的基础上,研究了半离散格式在L^2和L^∞范数意义下的最优误差估计．此外,为了进一步提高逼近解的精度,借助超收敛分析技术和插值后处理方法,研究了H^1范数意义下的整体超收敛以及后验误差估计。     

张量积二次长方体有限元梯度最大模的超逼近

对于某种三维椭圆边值问题,本文给出了长方体剖分下张量积二次长方体有限元的第一型弱估计以及离散导数Green函数的W^1,1半范估计,利用这两个估计本文获得了张量积二次长方体有限元梯度最大模的超逼近．进而,由超逼近也可以得到这种有限元梯度最大模的超收敛．     

含弥散平面两相渗流驱动问题有限元方法的误差分析

研究了平面两相渗流可压缩问题含弥散情形的矩形有限元格式．引进一类插值算子,通过插值函数证明了有限元解的最优误差估计．     

美式期权定价中非局部问题的有限元方法

在本文中 ,我们关心的是美式期权的有限元方法 .首先 ,根据 [4 ]我们对所讨论的问题引进一个新奇的实用的方法 ,它涉及到对原问题重新形成准确的数学公式 ,使得数值解的计算可以在非常小的区域上进行 ,从而该算法计算速度快精度高 .进而 ,我们利用超逼近分析技术得到了有限元解关于 L2 -模的最优估计 .     

A discontinuous finite volume element method for second‐order elliptic problems

In this article, we propose a new discontinuous finite volume element (DFVE) method for the second‐order elliptic problems. We treat the DFVE method as a perturbation of the interior penalty method and get a superapproximation estimate in a mesh dependent norm between the solution of the DFVE method and that of the interior penalty method. This reveals that the DFVE method is much closer to the interior penalty method than we have known. By using this superapproximation estimate, we can easily get the optimal order error estimates in the L² ‐norm and in the maximum norms of the DFVE method.© 2010 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq 28: 425–440, 2012     

美式期权定价中非局部问题有限元方法的整体超收敛与后验估计

我们利用积分恒等式与插值后处理技术 ,讨论美式期权非局部问题有限元方法关于 H 1-模的整体超收敛与后验估计 .     

Maximum‐norm superapproximation of the gradient for the trilinear block finite element

For a model elliptic boundary value problem in three dimensions, we give the weak estimate of the first type for trilinear block elements and the estimate for W^1,1‐seminorm of the discrete derivative Green's function over rectangular partitions of the domain, from which we obtain maximum‐norm superapproximation of the gradient for the trilinear block finite element approximation. Furthermore, utilizing this superapproximation, we can also obtain maximum‐norm superconvergence of the gradient. © 2007 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq, 2007     

A COMPLETE ANALYSIS FOR SOME A POSTERIORI ERROR ESTIMATES WITH THE FINITE ELEMENT METHOD OF LINES FOR A NONLINEAR PARABOLIC EQUATION

ABSTRACT

A posteriori error estimates for semidiscrete finite element methods for a nonlinear parabolic initial-boundary value problem are considered. The error estimates are obtained by solving local parabolic or elliptic equations for corrections to the solution on each element. The convergence results improve previous results where unnecessary assumptions are imposed on the approximate solution and the elliptic projection of the exact solution.     

强阻尼波动方程的H1-Galerkin混合有限元超收敛分析

研究了强阻尼波动方程的H¹-Galerkin混合有限元方法的超收敛性. 借助于协调线性三角形元已有的分析估计式, 直接利用插值算子代替原始变量 u 的 Ritz 投影和应力变量 p 的 Ritz-Volterra 投影,对半离散和全离散格式, 得到了u在 H¹(Ω) 模和 p 在 H(div;Ω) 模意义下比以往文献高一阶的超逼近和超收敛结果.     

Stokes型积分-微分方程的Crouzeix-Raviart型非协调三角形各向异性有限元方法

在半离散格式下.研究了Stokes型积分一微分方程的Crouzeix-Raviart型非协调三角形各向异性有限元方法,在不需要传统Ritz-Volterra投影下,通过辅助空间等新的技巧得到了与传统有限元方法相同的误差估计.     

有限元Ritz-Volterra投影的插值后处理

１．引言 有限元后验误差估计和超收敛性质在有限元计算中具有重要的实际意义．近年来,这方面的研究工作已取得较丰富的研究结果［１－４］,其中林群等提出的有限元插值后处理技术是一种很有效的研究手段．但目前的已有结果主要是关于椭圆问题有限元近似．本文将研究与时间依赖问题有限元方法密切相关的有限元 Ｒｉｔｚ－ Ｖｏｌｔｅｒｒａ投影问,在一些超收敛估计的基础上,利用插值后处理技术,得到了该投影经插值后处理后在 Ｌ２, Ｈ１, Ｌ∞和 Ｗ∞１范数下的整体超收敛性,进而导出在相应范数下的渐进准确后验误差估计．这些结果…     

各向异性网格下抛物方程一个新的非协调混合元收敛性分析

本文将 Crouzeix-Raviart 型非协调线性三角形元应用到抛物方程,建立了一个新的混合元格式.在抛弃传统有限元分析的必要工具 Ritz 投影算子的前提下,直接利用单元的插值性质和导数转移技巧, 分别得到了各向异性剖分下关于原始变量u 的H^-1-模和积分意义下L²-模以及通量p=-▽u 在L²-模下的最优阶误差估计.数值结果与我们的理论分析是相吻合的.     

双曲型方程的非协调变网格有限元方法

采用变网格的思想讨论了双曲型方程在各向异性网格下的Crouzeix-Raviart型非协调有限元逼近.在不需要引入传统分析中Riesz投影的情况下,得到了相应最优误差估计.     

A Finite Element Algorithm for Nematic Liquid Crystal Flow Based on the Gauge-Uzawa Method

In this paper,we present a finite element algorithm for the time-dependent nematic liquid crystal flow based on the Gauge-Uzawa method.This algorithm combines the Gauge and Uzawa methods within a finite element variational formulation,which is a fully discrete projection type algorithm,whereas many projection methods have been studied without space discretization.Besides,error estimates for velocity and molecular orientation of the nematic liquid crystal flow are shown.Finally,numerical results are given to show that the presented algorithm is reliable and confirm the theoretical analysis.     

角域上Green函数及其有限元解的一些估计

角域上Ｇｒｅｅｎ函数及其有限元解的一些估计黄云清（湘潭大学，湖南４１１１０５）林群（中国科学院系统科学研究所，北京１０００８０）１９８９年７月２２日收到，１９９０年１１月２７日收到修改稿。一、引言与主要结果设是平面角域，为所有角点集．为权函数．设，存...     

A new a priori error estimate of nonconforming finite element methods

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.     

带有记忆项和阻尼项的非线性双曲型方程的有限元方法

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.     

粘弹性方程的非协调变网格有限元方法

讨论了粘弹性方程的Crouzeix-Raviart型非协调变网格有限元方法,在不需要引入传统分析中Riesz投影的情况下得到了最优误差估计.     

SUPERCONVERGENCE OF RITZ-VOLTERRA PROJECTION ON FINITE ELEMENT SPACES

The purpose of this paper is to study the superconvergence properties of Ritz-Volterra projection.Through construction a new type of Green function and making use of its properties and the principle of duality,the paper proves that the Ritz-Volterra projection defined on r-1 order finite element spaces of Lagrange type in one and two space variable cases possesses O(h2r~2)order and O(h4+1|Inh|)order nodal superconvergence,respectively,and the same type of superconver-gence results are demonstrated for the semidiscrete finite dement approximate solutions of Soboleve-quations.     

On the approximation of the unsteady Navier–Stokes equations by finite element projection methods

This paper provides an analysis of a fractional-step projection method to compute incompressible viscous flows by means of finite element approximations. The analysis is based on the idea that the appropriate functional setting for projection methods must accommodate two different spaces for representing the velocity fields calculated respectively in the viscous and the incompressible half steps of the method. Such a theoretical distinction leads to a finite element projection method with a Poisson equation for the incremental pressure unknown and to a very practical implementation of the method with only the intermediate velocity appearing in the numerical algorithm. Error estimates in finite time are given. An extension of the method to a problem with unconventional boundary conditions is also considered to illustrate the flexibility of the proposed method. Received October 2, 1995 / Revised version received July 9, 1997