A numerical comparison between multi-revolution algorithms for first-order and second-order ODE systems

被引:0
|
作者
Melendo, MB [1 ]
机构
[1] Univ Zaragoza, CPS, Dpt Matemat Aplicada, E-50015 Zaragoza, Spain
来源
NUMERICAL ANALYSIS AND ITS APPLICATIONS | 2001年 / 1988卷
关键词
D O I
暂无
中图分类号
TP301 [理论、方法];
学科分类号
081202 ;
摘要
We test some envelope-following methods for first-order differential systems against their counterparts for second-order systems. Mile this latter kind of methods are more efficient than the usual second-order designed solvers, they only are more efficient than the envelope-following methods for first order systems in problems without dissipation of orbital dinamics.
引用
收藏
页码:586 / 593
页数:8
相关论文
共 50 条
  • [1] Relations Between Second-Order Fuchsian Equations and First-Order Fuchsian Systems
    Babich M.V.
    Slavyanov S.Y.
    [J]. Journal of Mathematical Sciences, 2019, 240 (5) : 646 - 650
  • [2] First-order, second-order, and third-order motion systems
    Sperling, G.
    [J]. PERCEPTION, 1998, 27 : 3 - 3
  • [3] A comparison of first-order and second-order transparency thresholds in stereopsis
    Langley, K.
    Fleet, D. J.
    Hibbard, P. B.
    [J]. PERCEPTION, 1998, 27 : 102 - 102
  • [4] No local cancellation between first-order and second-order motion
    Scott-Samuel, N. E.
    Smith, A. T.
    [J]. PERCEPTION, 1998, 27 : 184 - 184
  • [5] First-Order and Second-Order Ambiguity Aversion
    Lang, Matthias
    [J]. MANAGEMENT SCIENCE, 2017, 63 (04) : 1254 - 1269
  • [6] First-order and Second-order 3-D Hydrodynamics: A Comparison
    Williams, Harold A.
    [J]. CELESTIAL MECHANICS & DYNAMICAL ASTRONOMY, 1988, 45 (1-3): : 89 - 92
  • [7] PETSC TSADJOINT: A DISCRETE ADJOINT ODE SOLVER FOR FIRST-ORDER AND SECOND-ORDER SENSITIVITY ANALYSIS
    Zhang, Hong
    Constantinescu, Emil M.
    Smith, Barry F.
    [J]. SIAM JOURNAL ON SCIENTIFIC COMPUTING, 2022, 44 (01): : C1 - C24
  • [8] STABILITY IMPLICATIONS OF DELAY DISTRIBUTION FOR FIRST-ORDER AND SECOND-ORDER SYSTEMS
    Kiss, Gabor
    Krauskopf, Bernd
    [J]. DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B, 2010, 13 (02): : 327 - 345
  • [9] SECOND-ORDER DIFFERENCE SCHEME FOR QUASILINEAR HYPERBOLIC FIRST-ORDER SYSTEMS
    ABRASHIN, VN
    [J]. DOKLADY AKADEMII NAUK BELARUSI, 1972, 16 (01): : 8 - &
  • [10] Second-order PMD outage of first-order compensated fiber systems
    Kogelnik, H
    Nelson, LE
    Winzer, PJ
    [J]. IEEE PHOTONICS TECHNOLOGY LETTERS, 2004, 16 (04) : 1053 - 1055
12345