Analysis of a sequential regularization method for the unsteady Navier-Stokes equations

被引：1

作者：

Lu, Xiliang ^{[1
]}

Lin, Ping ^{[1
]}

Liu, Jian-Guo ^{[2
]}

机构：

[1] Natl Univ Singapore, Dept Math, Singapore 117543, Singapore

[2] Univ Maryland, Dept Math, College Pk, MD 20742 USA

来源：

MATHEMATICS OF COMPUTATION | 2008年 / 77卷 / 263期

基金：

美国国家科学基金会;

关键词：

Navier-Stokes equations; iterative penalty method; implicit parabolic PDE; error estimates; constrained dynamical system; stabilization method;

D O I：

10.1090/S0025-5718-08-02087-5

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

The incompressibility constraint makes Navier-Stokes equations difficult. A reformulation to a better posed problem is needed before solving it numerically. The sequential regularization method (SRM) is a reformulation which combines the penalty method with a stabilization method in the context of constrained dynamical systems and has the benefit of both methods. In the paper, we study the existence and uniqueness for the solution of the SRM and provide a simple proof of the convergence of the solution of the SRM to the solution of the Navier-Stokes equations. We also give error estimates for the time discretized SRM formulation.

引用

页码：1467 / 1494

页数：28

共 19 条

[1]

AMROUCHE C, 1994, CZECH MATH J, V44, P109

[2]

[Anonymous], 1995, CBMS NSF REGIONAL C

[3] Sequential regularization methods for nonlinear higher-index DAEs [J].

Ascher, U ;

Lin, P .

SIAM JOURNAL ON SCIENTIFIC COMPUTING, 1997, 18 (01) :160-181

[4] Sequential regularization methods for higher index DAEs with constraint singularities: The linear index-2 case [J].

Ascher, UM ;

Lin, P .

SIAM JOURNAL ON NUMERICAL ANALYSIS, 1996, 33 (05) :1921-1940

[5]

Baumgarte J., 1972, Computer Methods in Applied Mechanics and Engineering, V1, P1, DOI 10.1016/0045-7825(72)90018-7

[6]

Evans L.C., 1998, PARTIAL DIFFERENTIAL

[7]

Fortin M., 1983, STUDIES MATH ITS APP, V15

[8] Multi-multiplier ambient-space formulations of constrained dynamical systems, with an application to elastodynamics [J].

Gonzalez, O ;

Maddocks, JH ;

Pego, RL .

ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS, 2001, 157 (04) :285-323

[9] THEORY AND COMPUTATION OF PERIODIC-SOLUTIONS OF AUTONOMOUS PARTIAL-DIFFERENTIAL EQUATION BOUNDARY-VALUE-PROBLEMS, WITH APPLICATION TO THE DRIVEN CAVITY PROBLEM [J].

GUSTAFSON, K .

MATHEMATICAL AND COMPUTER MODELLING, 1995, 22 (09) :57-75

[10] FINITE-ELEMENT APPROXIMATION OF THE NONSTATIONARY NAVIER-STOKES PROBLEM .1. REGULARITY OF SOLUTIONS AND 2ND-ORDER ERROR-ESTIMATES FOR SPATIAL DISCRETIZATION [J].

HEYWOOD, JG ;

RANNACHER, R .

SIAM JOURNAL ON NUMERICAL ANALYSIS, 1982, 19 (02) :275-311

← 1 2 →