GLOBAL BEHAVIOR OF TWO THIRD ORDER RATIONAL DIFFERENCE EQUATIONS WITH QUADRATIC TERMS

被引:14
|
作者
Abo-Zeid, R. [1 ]
机构
[1] Higher Inst Engn & Technol, Dept Basic Sci, Al Obour Cairo, Egypt
来源
MATHEMATICA SLOVACA | 2019年 / 69卷 / 01期
关键词
difference equation; forbidden set; periodic solution; unbounded solution;
D O I
10.1515/ms-2017-0210
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
In this paper, we determine the forbidden sets, introduce an explicit formula for the solutions and discuss the global behaviors of solutions of the difference equations x(n+1) = ax(n)x(n-1)/+/- bx(n-1) + cx(n-2), n = 0, 1, ... where a, b, c are positive real numbers and the initial conditions x(-2), x(-1), x(0) are real numbers. (C) 2019 Mathematical Institute Slovak Academy of Sciences
引用
收藏
页码:147 / 158
页数:12
相关论文
共 50 条
  • [31] On third-order rational difference equations: Part 3
    Camouzis, E
    Chatterjee, E
    Ladas, G
    Quinn, EP
    JOURNAL OF DIFFERENCE EQUATIONS AND APPLICATIONS, 2004, 10 (12) : 1119 - 1127
  • [32] On third-order rational difference equations, part 2
    Camouzis, E
    Ladas, G
    Quinn, EP
    JOURNAL OF DIFFERENCE EQUATIONS AND APPLICATIONS, 2004, 10 (11) : 1041 - 1047
  • [33] On third-order rational difference equations, part 1
    Camouzis, E.
    Ladas, G.
    JOURNAL OF DIFFERENCE EQUATIONS AND APPLICATIONS, 2008, 14 (03) : 333 - 343
  • [34] Local Dynamics and Global Stability of Certain Second Order Rational Difference Equation in the First Quadrant with Quadratic Terms
    Bektesevic, Jasmin
    Hadziabdic, Vahidin
    Mehuljic, Midhat
    Masic, Adnan
    NEW TECHNOLOGIES, DEVELOPMENT AND APPLICATION V, 2022, 472 : 411 - 419
  • [35] GLOBAL BEHAVIOR OF TWO HIGHER-ORDER SYMMETRIC DIFFERENCE EQUATIONS
    Liu, Wanping
    Yang, Xiaofan
    UTILITAS MATHEMATICA, 2013, 92 : 89 - 96
  • [36] On the global periodicity of some difference equations of third order
    Balibrea, F.
    Linero, A.
    JOURNAL OF DIFFERENCE EQUATIONS AND APPLICATIONS, 2007, 13 (11) : 1011 - 1027
  • [37] Global Period-Doubling Bifurcation of a Certain Second-Order Quadratic Rational Difference Equations
    Mehuljic, Midhat
    Bektesevic, Jasmin
    Hadziabdic, Vahidin
    Mujic, Naida
    NEW TECHNOLOGIES, DEVELOPMENT AND APPLICATION V, 2022, 472 : 427 - 435
  • [38] Convergence Results on a Second-Order Rational Difference Equation with Quadratic Terms
    Chan, D. M.
    Kent, C. M.
    Ortiz-Robinson, N. L.
    ADVANCES IN DIFFERENCE EQUATIONS, 2009,
  • [39] Convergence Results on a Second-Order Rational Difference Equation with Quadratic Terms
    D. M. Chan
    C. M. Kent
    N. L. Ortiz-Robinson
    Advances in Difference Equations, 2009
  • [40] Classification of global behavior of a system of rational difference equations
    Matsunaga, Hideaki
    Suzuki, Rina
    APPLIED MATHEMATICS LETTERS, 2018, 85 : 57 - 63
12345