Dynamics of a Delay Logistic Equation with Slowly Varying Coefficients

被引:0
|
作者
S. A. Kashchenko
机构
[1] Yaroslavl State University,
[2] National Research Nuclear University “MEPhI”,undefined
来源
Computational Mathematics and Mathematical Physics | 2018年 / 58卷
关键词
bifurcations; stability; normal forms; singular perturbations; dynamics;
D O I
暂无
中图分类号
学科分类号
摘要
引用
收藏
页码:1926 / 1936
页数:10
相关论文
共 50 条
  • [31] Output Feedback Control for Uncertain Nonlinear Systems with Slowly Varying Input Delay
    Dinh, H. T.
    Fischer, N.
    Kamalapurkar, R.
    Dixon, W. E.
    2013 AMERICAN CONTROL CONFERENCE (ACC), 2013, : 1745 - 1750
  • [32] Stability, bifurcation and a new chaos in the logistic differential equation with delay
    Jiang, MH
    Shen, Y
    Jian, JG
    Liao, XX
    PHYSICS LETTERS A, 2006, 350 (3-4) : 221 - 227
  • [33] Dynamical analysis of a logistic equation with spatio-temporal delay
    Zhang, Jia-Fang
    Sun, Yu-Juan
    APPLIED MATHEMATICS AND COMPUTATION, 2014, 247 : 996 - 1002
  • [34] Dynamics of a Chain of Logistic Equations with Delay and Antidiffusive Coupling
    Kashchenko, S. A.
    DOKLADY MATHEMATICS, 2022, 105 (01) : 18 - 22
  • [35] Dynamics of a Chain of Logistic Equations with Delay and Antidiffusive Coupling
    S. A. Kashchenko
    Doklady Mathematics, 2022, 105 : 18 - 22
  • [36] Well-posedness and dynamics for the von Karman equation with memory and nonlinear time-varying delay
    Cui, Xiaona
    Li, Ke
    MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2023, 46 (14) : 15481 - 15505
  • [37] Additional dynamics for time varying systems with delay
    Kharitonov, VL
    Melchor-Aguilar, D
    PROCEEDINGS OF THE 40TH IEEE CONFERENCE ON DECISION AND CONTROL, VOLS 1-5, 2001, : 4721 - 4726
  • [38] Dynamics for the damped Boussinesq equation with delay
    Zhao, Lu
    Yang, Meihua
    Zhang, Chengjian
    STOCHASTICS AND DYNAMICS, 2016, 16 (06)
  • [39] Stationary solutions for the non-linear Hartree equation with a slowly varying potential
    Macri, Marta
    Nolasco, Margherita
    NODEA-NONLINEAR DIFFERENTIAL EQUATIONS AND APPLICATIONS, 2009, 16 (06): : 681 - 715
  • [40] Global behaviour of solutions of a nonautonomous delay logistic difference equation, II
    Kocic, V. L.
    JOURNAL OF DIFFERENCE EQUATIONS AND APPLICATIONS, 2011, 17 (04) : 487 - 504
12345