Time discretizations for evolution problems

被引:0
|
作者
Miloslav Vlasák
机构
[1] Charles University,Department of Mathematical Analysis
[2] Faculty of Mathematics and Physics,undefined
来源
Applications of Mathematics | 2017年 / 62卷
关键词
time discretizations; parabolic PDEs; stiff ODEs; Runge-Kutta methods; multi-step methods; 65J10; 65L04; 65L20;
D O I
暂无
中图分类号
学科分类号
摘要
The aim of this work is to give an introductory survey on time discretizations for liner parabolic problems. The theory of stability for stiff ordinary differential equations is explained on this problem and applied to Runge-Kutta and multi-step discretizations. Moreover, a natural connection between Galerkin time discretizations and Runge-Kutta methods together with order reduction phenomenon is discussed.
引用
收藏
页码:135 / 169
页数:34
相关论文
共 50 条
  • [31] Domain discretizations for numerical solution of fracture problems
    Korshunov, Vladimir A.
    Mashchenko, Anastasia, V
    Mudrik, Roman S.
    Ponomarev, Dmitry A.
    Rodionov, Alexander A.
    MARINE INTELLECTUAL TECHNOLOGIES, 2021, (04): : 45 - 52
  • [32] ASSESSMENT OF TIME DISCRETIZATIONS AND LDG METHODS FOR DIFFUSION AND NONLINEAR REACTION PROBLEMS IN 2D
    Castillo, P.
    Henriquez, I.
    REVISTA MEXICANA DE INGENIERIA QUIMICA, 2017, 16 (02): : 541 - 554
  • [33] Convergence of second-order in time numerical discretizations for the evolution Navier-Stokes equations
    Berselli, Luigi C.
    Spirito, Stefano
    ADVANCES IN CONTINUOUS AND DISCRETE MODELS, 2022, 2022 (01):
  • [34] Stability of Galerkin discretizations of a mixed space-time variational formulation of parabolic evolution equations
    Stevenson, Rob
    Westerdiep, Jan
    IMA JOURNAL OF NUMERICAL ANALYSIS, 2021, 41 (01) : 28 - 47
  • [35] Analysis of discretizations of parabolic problems in pairs of spaces
    Bakaev, NY
    BIT, 2000, 40 (01): : 1 - 23
  • [36] Symmetric finite volume discretizations for parabolic problems
    Ma, XL
    Shu, S
    Zhou, AH
    COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING, 2003, 192 (39-40) : 4467 - 4485
  • [37] On Ritz type discretizations for optimal control problems
    Felgenhauer, U
    SYSTEMS MODELLING AND OPTIMIZATION, 1999, 396 : 91 - 99
  • [38] Convergence of pseudospectral discretizations of optimal control problems
    Ross, IM
    Fahroo, F
    PROCEEDINGS OF THE 40TH IEEE CONFERENCE ON DECISION AND CONTROL, VOLS 1-5, 2001, : 3175 - 3177
  • [39] DISCRETIZATIONS OF MULTISTAGE STOCHASTIC PROGRAMMING-PROBLEMS
    OLSEN, P
    MATHEMATICAL PROGRAMMING STUDY, 1976, 6 (DEC): : 111 - 124
  • [40] Isogeometric collocation discretizations for acoustic wave problems
    Zampieri, Elena
    Pavarino, Luca F.
    COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING, 2021, 385
12345