Stabilized finite volume element method for the 2D nonlinear incompressible viscoelastic flow equation

被引:0
|
作者
Hong Xia
Zhendong Luo
机构
[1] North China Electric Power University,School of Control and Computer Engineering
[2] North China Electric Power University,School of Mathematics and Physics
来源
Boundary Value Problems | / 2017卷
关键词
stabilized finite volume element method; a non-dimensional real together with two Gaussian quadratures; incompressible nonlinear viscoelastic flow equation; existence, stability, and error estimate; 65N30; 35Q10;
D O I
暂无
中图分类号
学科分类号
摘要
In this article, we devote ourselves to building a stabilized finite volume element (SFVE) method with a non-dimensional real together with two Gaussian quadratures of the nonlinear incompressible viscoelastic flow equation in a two-dimensional (2D) domain, analyzing the existence, stability, and error estimates of the SFVE solutions and verifying the validity of the preceding theoretical conclusions by numerical simulations.
引用
收藏
相关论文
共 50 条
  • [31] 2D–3D hybrid stabilized finite element method for tsunami runup simulations
    S. Takase
    S. Moriguchi
    K. Terada
    J. Kato
    T. Kyoya
    K. Kashiyama
    T. Kotani
    Computational Mechanics, 2016, 58 : 411 - 422
  • [32] A coupled finite volume flow solver for the solution of incompressible viscoelastic flows
    Fernandes, C.
    Vukcevic, V.
    Uroic, T.
    Simoes, R.
    Carneiro, O. S.
    Jasak, H.
    Nobrega, J. M.
    JOURNAL OF NON-NEWTONIAN FLUID MECHANICS, 2019, 265 : 99 - 115
  • [33] A generalized parametric iterative finite element method for the 2D/3D stationary incompressible magnetohydrodynamics
    Yin, Lina
    Huang, Yunqing
    Tang, Qili
    APPLIED NUMERICAL MATHEMATICS, 2023, 193 : 242 - 261
  • [34] Incompressible flow modeling using an adaptive stabilized finite element method based on residual minimization
    Kyburg, Felix E.
    Rojas, Sergio
    Calo, Victor M.
    INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN ENGINEERING, 2022, 123 (08) : 1717 - 1735
  • [35] Numerical Analysis of a Picard Multilevel Stabilization of Mixed Finite Volume Method for the 2D/3D Incompressible Flow with Large Data
    Li, Jian
    Lin, Xiaolin
    Zhao, Xin
    NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS, 2018, 34 (01) : 30 - 50
  • [36] A local domain boundary element method for solving 2D incompressible fluid flow problems
    Sellountos, Euripides J.
    V. Gortsas, Theodore
    Polyzos, Demosthenes
    ENGINEERING ANALYSIS WITH BOUNDARY ELEMENTS, 2023, 150 : 457 - 481
  • [37] A Parallel Subgrid Stabilized Finite Element Method Based on Two-Grid Discretization for Simulation of 2D/3D Steady Incompressible Flows
    Shang, Yueqiang
    Huang, Shumei
    JOURNAL OF SCIENTIFIC COMPUTING, 2014, 60 (03) : 564 - 583
  • [38] A Parallel Subgrid Stabilized Finite Element Method Based on Two-Grid Discretization for Simulation of 2D/3D Steady Incompressible Flows
    Yueqiang Shang
    Shumei Huang
    Journal of Scientific Computing, 2014, 60 : 564 - 583
  • [39] The Crank–Nicolson finite element method for the 2D uniform transmission line equation
    Hulin Ren
    Yiting Fan
    Zhendong Luo
    Journal of Inequalities and Applications, 2020
  • [40] A structure-preserving Partitioned Finite Element Method for the 2D wave equation
    Cardoso-Ribeiro, Flavio Luiz
    Matignon, Denis
    Lefevre, Laurent
    IFAC PAPERSONLINE, 2018, 51 (03): : 119 - 124
12345