An Augmented Lagrangian Uzawa IterativeMethod for Solving Double Saddle-Point Systems with Semidefinite(2,2)Block and its Application to DLM/FDMethod for Elliptic Interface Problems 被引量：2

导出

摘要 .In this paper,an augmented Lagrangian Uzawa iterative method is developed and analyzed for solving a class of double saddle-point systems with semidefinite(2,2)block.Convergence of the iterativemethod is proved under the assumption that the double saddle-point problem exists a unique solution.An application of the iterative method to the double saddle-point systems arising from the distributed Lagrange multiplier/fictitious domain(DLM/FD)finite element method for solving elliptic interface problems is also presented,in which the existence and uniqueness of the double saddle-point system is guaranteed by the analysis of the DLM/FD finite element method.Numerical experiments are conducted to validate the theoretical results and to study the performance of the proposed iterative method.

作者 Cheng Wang Pengtao Sun

机构地区 School of Mathematical Sciences Department of Mathematical Sciences

出处《Communications in Computational Physics》 SCIE 2021年第6期124-143,共20页 计算物理通讯（英文）

基金 supported by the 10 plus 10 project of Tongji University(No.4260141304/004/010).

关键词 Double saddle-point problem augmented Lagrangian Uzawa method elliptic interface problem distributed Lagrange multiplier/fictitious domain(DLM/FD)method

分类号 O17 [理学—基础数学]

引文网络
相关文献

参考文献2

1Tatiana S. Martynova.ON AUGMENTED LAGRANGIAN METHODS FOR SADDLE-POINT LINEAR SYSTEMS WITH SINGULAR OR SEMIDEFINITE （1, 1） BLOCKS[J].Journal of Computational Mathematics,2014,32(3):297-305. 被引量：1
2Andrew Lundberg,Pengtao Sun,Cheng Wang,Chen-song Zhang.Distributed Lagrange Multiplier/Fictitious Domain Finite Element Method for a Transient Stokes Interface Problem with Jump Coefficients[J].Computer Modeling in Engineering & Sciences,2019(4):35-62. 被引量：2

二级参考文献18

1M. Arioli and G. Manzini, A null space algorithm for mixed finite-element approximations of Darcy's equation, Communications in Numerical Methods in Engineering, 18 (2002): 645-657.
2Z.-Z. Bai, Eigenvalue estimates for saddle-point matrices of Hermitian and indefinite leading blocks, Journal of Computational and Applied Mathematics, 237 (2013): 295-306.
3Z.-Z. Bai, Optimal parameters in the HSS-like methods for saddle-point problems, Numerical Linear Algebra with Applications, 26 (2009): 447-479.
4Z.-Z. Bai and G.H. Golub, Accelerated Hermitian and skew-Hermitian splitting methods for saddle-point problems, IMA Journal of Numerical Analysis, 27 (2007): 1-23.
5Z.-Z. Bai, G.H. Golub and M.K. Ng, Hermitian and skew-Hermitian splitting methods for non- Hermitian positive definite linear systems, SIAM Journal on Matrix Analysis and Applications, 24 (2003): 603-626.
6Z.-Z. Bai, G.H. Golub and J.-Y. Pan, Preconditioned Hermitian and skew-Hermitian splitting methods for non-Hermitian positive semidefinite linear systems, Numerische Mathematik, 98 (2004): 1-32.
7Z.-Z. Bai, B.N. Parlett and Z.-Q. Wang, On generalized successive overrelaxation methods for augmented linear systems, Numerische Mathematik, 102 (2005): 1-38.
8M. Benzi, Solution of equality-constrained quadratic programming problems by a projection iter- ative method, Rendiconti di Matematica e delle sue Applicazioni, 13 (1993): 275-296.
9M. Benzi and G.H. Golub, A preconditioner for generalized saddle point problems, SIAM Journal on Matrix Analysis and Applications, 26 (2004): 20-41.
10M. Benzi, M.J. Gander and G.H. Golub, Optimization of the Hermitian and skew-Hermitian splitting iteration for saddle-point problems, BIT Numerical Mathematics, 43 (2003): 881-900.

共引文献1

1Zhilin Li,X.Sheldon Wang,Lucy T.Zhang.Preface:Simulation of Fluid-Structure Interaction Problems[J].Computer Modeling in Engineering & Sciences,2019(4):1-3.

同被引文献14

1王东红,赵宁,胡偶,刘剑明.A GHOST FLUID BASED FRONT TRACKING METHOD FOR MULTIMEDIUM COMPRESSIBLE FLOWS[J].Acta Mathematica Scientia,2009,29(6):1629-1646. 被引量：3
2JIANG Liang,GE Han,FENG ChengLiang,CHEN DaRong.Numerical simulation of underwater explosion bubble with a refined interface treatment[J].Science China(Physics,Mechanics & Astronomy),2015,58(4):91-100. 被引量：5
3Thad Michael,Jianming Yang,Frederick Stern.A sharp interface approach for cavitation modeling using volume-of-fluid and ghost-fluid methods[J].Journal of Hydrodynamics,2017,29(6):917-925. 被引量：4
4Mingjun LI,Li ZHU.Interfacial instability of ferrofluid flow under the influence of a vacuum magnetic field[J].Applied Mathematics and Mechanics(English Edition),2021,42(8):1171-1182. 被引量：2
5T.G.Liu,B.C.Khoo,W.F.Xie.The Modified Ghost Fluid Method as Applied to Extreme Fluid-Structure Interaction in the Presence of Cavitation[J].Communications in Computational Physics,2006,1(5):898-919. 被引量：2
6Wei Liu,Li Yuan,Chi-Wang Shu.A Conservative Modification to the Ghost Fluid Method for Compressible Multiphase Flows[J].Communications in Computational Physics,2011,10(9):785-806. 被引量：2
7Jianxian Qiu,Tiegang Liu,Boo Cheong Khoo.Simulations of Compressible Two-Medium Flow by Runge-Kutta Discontinuous Galerkin Methods with the Ghost Fluid Method[J].Communications in Computational Physics,2008,3(2):479-504. 被引量：7
8Liang Xu,Tiegang Liu.Optimal Error Estimation of the Modified Ghost Fluid Method[J].Communications in Computational Physics,2010,8(7):403-426. 被引量：2
9Philip Barton,Evgeniy Romenski.On Computational Modelling of Strain-Hardening Material Dynamics[J].Communications in Computational Physics,2012,11(5):1525-1546. 被引量：1
10Junseok Kim.Phase-Field Models for Multi-Component Fluid Flows[J].Communications in Computational Physics,2012,12(8):613-661. 被引量：9

引证文献2

1Mingchao Cai,Guoliang Ju,Jingzhi Li.Schur Complement Based Preconditioners for Twofold and Block Tridiagonal Saddle Point Problems[J].Communications in Mathematical Research,2024,40(2):214-244.
2Liang Xu,Tiegang Liu.Ghost-Fluid-Based Sharp Interface Methods for Multi-Material Dynamics:A Review[J].Communications in Computational Physics,2023,34(8):563-612.

1Arthur Sarthou,Stéphane Vincent,Philippe Angot,Jean-Paul Caltagirone.The Algebraic Immersed Interface and Boundary Method for Elliptic Equations with Jump Conditions[J].Open Journal of Fluid Dynamics,2020,10(3):239-269.
2Zhijun Tan,D.V.Le,K.M.Lim,B.C.Khoo.An Immersed Interface Method for the Simulation of Inextensible Interfaces in Viscous Fluids[J].Communications in Computational Physics,2012,11(3):925-950.
3Liu Nan,Liming Zheng,Jie Xu,Jia Wang,Cuixia Hu,Jun Lan,Xing Zhang,Jincan Zhang,Kui Xu,Hang Cheng,Zi Yang,Xin Gao,Xinquan Wang,Hailin Peng,Yanan Chen,Hong-Wei Wang.Reduced graphene oxide membrane as supporting film for high-resolution cryo-EM[J].Biophysics Reports,2021,7(3):227-238.
4Marco Cisternino,Lisl Weynans.A Parallel Second Order Cartesian Method for Elliptic Interface Problems[J].Communications in Computational Physics,2012,12(10):1562-1587.
5Xing Shi,Guang Lin.Modeling the Sedimentation of Red Blood Cells in Flow under Strong External Magnetic Body Force Using a Lattice Boltzmann Fictitious DomainMethod[J].Numerical Mathematics(Theory,Methods and Applications),2014,7(4):512-523.
6闫佳文,周磊,郑焕坤,陈长金,蒋春悦.基于增广拉格朗日交替方向非精确牛顿法配电网电源机会约束分布式控制[J].科学技术与工程,2022,22(8):3160-3168. 被引量：5
7马峰,倪明放.非正则线性增广拉格朗日乘子法的收敛速率研究[J].高等学校计算数学学报,2022,44(1):36-49.
8Zhilin Li,Peng Song.An Adaptive Mesh Refinement Strategy for Immersed Boundary/Interface Methods[J].Communications in Computational Physics,2012,12(7):515-527.
9Pengzhan Huang,Yinnian He,Ting Li.A FINITE ELEMENT ALGORITHM FOR NEMATIC LIQUID CRYSTAL FLOW BASED ON THE GAUGE-UZAWA METHOD[J].Journal of Computational Mathematics,2022,40(1):26-43.
10Xiaoxiao He,Fei Song,Weibing Deng.A Well-Conditioned, Nonconforming Nitsche’s Extended Finite Element Method for Elliptic Interface Problems[J].Numerical Mathematics(Theory,Methods and Applications),2020,13(1):99-130. 被引量：1

Communications in Computational Physics

2021年第6期

浏览历史

内容加载中请稍等...