Stokes方程基于多尺度增量函数的稳定化有限体积元方法

提出了求解Stokes方程的一种新稳定化有限体积元算法.这种新方法基于多尺度增量函数思想且能够采用P1/P0有限元对进行求解.文中得到了算法的稳定性和速度、压力分别在H1-范数与L2-范数下的最优收敛阶.利用Stokes方程的对偶问题,我们给出了速度关于L2-范数的最优收敛阶.     

非定常Stokes方程的全离散稳定化有限元格式

本文研究二维非定常Stokes方程全离散稳定化有限元方法.首先给出关于时间向后一步Euler半离散格式,然后直接从该时间半离散格式出发,构造基于两局部高斯积分的稳定化全离散有限元格式,其中空间用P_1—P_1元逼近,证明有限元解的误差估计.本文的研究方法使得理论证明变得更加简便,也是处理非定常Stokes方程的一种新的途径.     

定常Navier-Stokes方程的一种高效稳定有限元方法

提出了二维定常Navier-Stokes(N-S)方程的一种两层稳定有限元方法.该方法基于局部高斯积分技术,通过不满足inf-sup条件的低次等阶有限元对N-S方程进行有限元求解.该方法在粗网格上解定常N-S方程,在细网格上只需解一个Stokes方程.误差分析和数值试验都表明:两层稳定有限元方法与直接在细网格上采用的传统有限元方法得到的解具有同阶的收敛性,但两层稳定有限元方法节省了大量的工作时间.     

EFK方程一个新的低阶非协调混合有限元方法的高精度分析

对Extended Fisher-Kolmogorov(EFK)方程,利用EQ_1~(rot)元和零阶RaviartThomas(R-T)元建立了一个新的非协调混合元逼近格式.首先,证明了半离散格式逼近解的一个先验估计并证明了逼近解的存在唯一性.在半离散格式下,利用上述两种元的高精度分析结果以及这个先验估计,在不需要有限元解u_h属于L~∞的条件下,得到了原始变量u和中间变量v=-?u的H~1-模以及流量p=u的(L~2)~2-模意义下O(h~2)阶的超逼近性质.同时,借助插值后处理技术,证明了上述变量的具有O(h~2)阶的整体超收敛结果.其次,建立了一个新的线性化向后Euler全离散格式并证明了其逼近解的存在唯一性.另一方面,通过对相容误差和非线性项采取与传统误差分析不同的新的分裂技巧,分别导出了以往文献中尚未涉及的关于u和v在H~1-模以及p在(L~2)~2-模意义下具有O(h~2+τ)阶的超逼近性质,进一步地,借助插值后处理技术,得到了上述变量的整体超收敛结果.这里h和τ分别表示空间剖分参数和时间步长.最后,给出了一个数值算例,计算结果验证了理论分析的正确性.     

Navier-Stokes方程的低阶混合有限元方法

1引言 定常N-s方程是流体力学中一类非常重要的方程,而经典的混合有限元方法要求有限元空间组合满足B-B条件.这一条件限制了工程中常用的低阶有限元空间如:P1/P1,P,/Po等.为了去掉LBB条件限制,产生了一种新的方法--稳定化方法(也成CBB方法).1988年,F.Brezzi和J.Douglas.Jr对线性的Stokes方程建立了一种稳定化格式([2]).对于低阶的有限元应用压力投影稳定项构造了一种稳定化格式,并给出了格式的解存在唯一性,且给出了几种有限元的算例.     

非定常线性化Navier-Stokes方程的子格粘性非协调有限元方法

本文结合子格粘性法的思想,空间采用非协调Crouzeix-Raviart元逼近,时间采用Crank-Nicolson差分离散,对非定常线性化Navier-Stokes方程建立了全离散的子格粘性非协调有限元格式.对稳定性和误差估计作出了详细的分析, 得出了最优的误差估计.最后, 通过数值算例进一步验证了该方法的稳定性和收敛性.     

Sine-Gordon方程的一类低阶非协调有限元分析

本文讨论了Sine-Gordon方程的一类低阶非协调有限元一般逼近格式,直接利用插值技巧和单元的特殊性质导出了相应未知量的最优误差估计.     

非定常Stokes方程的稳定化全离散有限体积元格式

本文研究非定常Stokes方程的有限体积元方法,给出一种基于两个局部高斯积分的稳定化全离散格式,并给其有限体积元解的误差分析.     

广义神经传播方程的低阶H~1-Galerkin混合元方法

讨论了广义神经传播方程的低阶H~1-Galerkin混合元方法.其逼近空间不需要满足LBB条件,并且在不需要采用Ritz投影的情况下,通过插值算子,平均值技巧和高精度分析结果得到了超逼近性质,进而通过插值后处理技术导出了H~1-模的整体超收敛结果.     

非定常Stokes方程的降阶稳定化CN有限体积元外推模型

利用稳定化的Crank-Nicolson(CN)有限体积元方法和特征投影分解方法,建立非定常Stokes方程的一种自由度很少、精度足够高的降阶稳定化CN有限体积元外推模型,并给出这种降阶稳定化CN有限体积元外推模型解的误差估计和算法的实现.最后用数值例子说明数值结果与理论结果相吻合,并阐明这种降阶稳定化CN有限体积元外推模型的优越性.     

The Mortar Element Method with Lagrange Multipliers for Stokes Problem

In this paper,we propose a mortar element method with Lagrange multiplier for incompressible Stokes problem,i.e.,the matching constraints of velocity on mortar edges are expressed in terms of Lagrange multipliers.We also present P_1 noncon- forming element attached to the subdomains.By proving inf-sup condition,we derive optimal error estimates for velocity and pressure.Moreover,we obtain satisfactory approximation for normal derivatives of the velocity across the interfaces.     

A new family of stable mixed finite elements for the 3D Stokes equations

A natural mixed-element approach for the Stokes equations in the velocity-pressure formulation would approximate the velocity by continuous piecewise-polynomials and would approximate the pressure by discontinuous piecewise-polynomials of one degree lower. However, many such elements are unstable in 2D and 3D. This paper is devoted to proving that the mixed finite elements of this - type when satisfy the stability condition--the Babuska-Brezzi inequality on macro-tetrahedra meshes where each big tetrahedron is subdivided into four subtetrahedra. This type of mesh simplifies the implementation since it has no restrictions on the initial mesh. The new element also suits the multigrid method.

     

Analysis of strain-pressure finite element methods for the Stokes problem

An analysis of some nonconforming approximations of the Stokes problem is presented. The approximations are based on a strain-pressure variational formulation. In particular, a convergence and stability result for a method recently proposed by Bathe and Pantuso is provided. © 1997 John Wiley & Sons, Inc. Numer Methods Partial Differential Eq 13: 717–730, 1997     

Petrov-Galerkin Spectral Element Method for Mixed Inhomogeneous Boundary Value Problems on Polygons

The authors investigate Petrov-Galerkin spectral element method. Some results on Legendre irrational quasi-orthogonal approximations are established, which play important roles in Petrov-Galerkin spectral element method for mixed inhomogeneous boundary value problems of partial differential equations defined on polygons. As examples of applications, spectral element methods for two model problems, with the spectral accuracy in certain Jacobi weighted Sobolev spaces, are proposed. The techniques developed in this paper are also applicable to other higher order methods.     

定常Navier—Stokes方程的Petrov—Galerkin方法

研究了定常Navier－Stokes方程的四种Petrov－Galerkin有限元方法：PG1，PG2，SD和GLS．它们都是稳定的，避免了经典混合方法中必要的Babuska－Brezzi条件．给出了各种方法有限元解的存在性、唯一性和唯一解的误差估计．     

A new approximation technique for div-curl systems

In this paper, we describe an approximation technique for div-curl systems based in where is a domain in . We formulate this problem as a general variational problem with different test and trial spaces. The analysis requires the verification of an appropriate inf-sup condition. This results in a very weak formulation where the solution space is and the data reside in various negative norm spaces. Subsequently, we consider finite element approximations based on this weak formulation. The main approach of this paper involves the development of ``stable pairs" of discrete test and trial spaces. With this approach, we enlarge the test space so that the discrete inf-sup condition holds and we use a negative-norm least-squares formulation to reduce to a uniquely solvable linear system. This leads to optimal order estimates for problems with minimal regularity which is important since it is possible to construct magnetostatic field problems whose solutions have low Sobolev regularity (e.g., with ). The resulting algebraic equations are symmetric, positive definite and well conditioned. A second approach using a smaller test space which adds terms to the form for stabilization will also be mentioned. Some numerical results are also presented.

     

Staggered Taylor–Hood and Fortin elements for Stokes equations of pressure boundary conditions in Lipschitz domain

The purpose of this paper is to develop a general theory on how the inf-sup stable and convergent elements of the velocity Dirichlet boundary (VDB)-Stokes problem with no-slip VDB are still inf-sup stable and convergent for the pressure Dirichlet boundary (PDB)-Stokes problem with PDB in Lipschitz domain. The PDB-Stokes problem in a Lipschitz domain usually only has a singular velocity solution which does not belong to (H¹(Ω))², sharply in contrast to the VDB-Stokes problem whose velocity solution still belongs to (H¹(Ω))², and unexpectedly, some well-known inf-sup stable and convergent VDB-Stokes elements may or may no longer correctly converge. It turns out that the inf-sup condition of the PDB-Stokes problem in Lipschitz domain relies on an unusual variational problem and requires adequate degrees of freedom on the domain boundary. In this paper we propose two families of staggered elements: staggered Taylor–Hood elements with ℓ ≥ 1 (continuous in both velocity and pressure) and staggered Fortin elements with m ≥ 1 (continuous in velocity and discontinuous in pressure) on triangles, for solving the PDB-Stokes problem in Lipschitz domain. We show that the two families are inf-sup stable and are correctly convergent for the non-H¹ singular velocity. Numerical results illustrate the proposed elements and the theoretical results.     

一类Stokes方程的最小二乘混合元方法

对定常和非定常两种类型的Stokes方程建立了一类新的最小二乘混合元方法,并进行了分析,对定常的方程,采用了对u和σ的不同指标的有限元空间进行计算(LBB条件不需要),得到了最优的H1和L2模估计.对非定常的方程,采用了传统的Raviart-Thomas混合元空间,得到了最优的L2模估计.     

On stability of the P n mod /P n element for incompressible flow problems

It is well known that finite element spaces used for approximating the velocity and the pressure in an incompressible flow problem have to be stable in the sense of the inf-sup condition of Babuška and Brezzi if a stabilization of the incompressibility constraint is not applied. In this paper we consider a recently introduced class of triangular nonconforming finite elements of nth order accuracy in the energy norm called P _n ^mod elements. For n ≤ 3 we show that the stability condition holds if the velocity space is constructed using the P _n ^mod elements and the pressure space consists of continuous piecewise polynomial functions of degree n. This research has been supported by the Grant Agency of the Czech Republic under the grant No. 201/05/0005 and by the grant MSM 0021620839.     

Stokes问题的区域分解法

本文主要讨论了Ｓｔｏｋｅｓ问题的非重迭型两仓区域性情形的区域分解算法，首先讨论了连续情形，然后将区域分解算法应用到Ｓｔｏｋｅｓ问题的非协调离散情形。