On the System of Nonlinear Rational Difference Equations
This paper is concerned with the global asymptotic
behavior of positive solution for a system of two nonlinear rational
difference equations. Moreover, some numerical examples are given
to illustrate results obtained.
[1] M.P. Hassell and H.N. Comins, Discrete time models for two-species
competition, Theoretical Population Biology, Vol. 9, no. 2,1976, pp.
202–221.
[2] J.E. Franke and A.A. Yakubu, Mutual exclusion versus coexistence for
discrete competitive Systems, Journal of Mathematical Biology, Vol.30,
no. 2,1991, pp. 161–168.
[3] Marwan Aloqeili, Dynamics of a rational difference equation, Appl.
Math. Comput., Vol. 176, no. 2, 2006, pp. 768–774.
[4] C. Cinar, On the positive solutions of the difference equation xn+1 =
xn−1
1+xnxn−1
, Appl. Math. Compt. Vol.150, 2004, pp. 21–24.
[5] C. Cinar, On the positive solutions of the difference equation xn+1 =
xn−1
1+axnxn−1
, Appl. Math. Compt., Vol. 158, no.3,2004, pp. 809–812.
[6] C. Cinar, On the positive solutions of the difference equation xn+1 =
xn−1
−1+axnxn−1
, Appl. Math. Compt., Vol. 158, no.3, 2004, pp. 793–797.
[7] C. Cinar, On the positive solutions of the difference equation xn+1 =
axn−1
1+bxnxn−1
, Appl. Math. Compt., vol.156, 2004, pp. 587–590.
[8] B. Iricanin and S. Stevic, Some Systems of Nonlinear Difference Equations
of Higher Order with Periodic Solutions, Dynamics of Continuous,
Discrete and Impulsive Systems. Series A Mathematical Analysis, Vol.
13, No. 3-4, 2006, pp. 499–507.
[9] G. Papaschinopoulos and C.J. Schinas, On a system of two nonlinear
difference equations, J. Math. Anal. Appl. Vol. 219, 1998, pp. 415–426.
[10] D. Clark and M. R. S. Kulenovic, A coupled system of rational
difference equations, Comput Math Appl., Vol. 43, 2002, pp. 849–867
.
[11] D. Clark, M. R. S. Kulenovic and J. F. Selgrade, Global asymptotic
behavior of a two-dimensional difference equation modelling competition,
Nonlinear Analysis, Vol. 52, 2003, pp. 1765–1776.
[12] Q. Zhang, L. Yang and J. Liu, Dynamics of a system of rational
third-order difference equation, Advances in Difference Equations 2012,
2012: 136, pp. 1–8.
[13] J. Diblik, B. Iricanin, S. Stevic and Z. Smarda, On some symmetric
systems of difference equations, Abstract and Applied Analysis, Vol. 2013,
2013, Article ID 246723,pp. 1–7.
[14] Q. Din, M.N. Qureshi and A. Q. Khan, Dynamics of a
fourth-order system of rational difference equations, Advances in
Difference Equations, Vol.2012, 215, 2012, pp.1–15.
[15] T. F. Ibrahim and Q. Zhang, Stability of an anti-competitive system of
rational difference equations, Archives Des Sciences, Vol. 66, 2013, pp.
44–58.
[16] V.L. Kocic and G. Ladas, Global behavior of nonlinear difference
equations of higher order with application , Kluwer Academic Publishers,
Dordrecht, 1993.
[17] M.R.S. Kulenovic and O. Merino, Discrete dynamical systems and
difference equations with mathematica, Chapman and Hall/CRC, Boca
Raton, London, 2002.
[18] T.F. Ibrahim, Two-dimensional fractional system of nonlinear difference
equations in the modeling competitive populations, International Journal
of Basic & Applied Sciences, Vol.12, no. 05, 2012, pp. 103–121.
[19] K. Liu , Z. Zhao, X. Li and P. Li, More on three-dimensional systems of
rational difference equations, Discrete Dynamics in Nature and Society,
Vol. 2011, Article ID 178483, 2011.
[20] E.M.E. Zayed and M.A. El-Moneam, On the global attractivity of two
nonlinear difference equations, J. Math. Sci., Vol. 177, 2011, pp. 487–499.
[21] N. Touafek and E.M. Elsayed, On the periodicity of some systems of
nonlinear difference equations, Bull. Math. Soc. Sci. Math. Roumanie,
Vol. 2, 2012, pp. 217–224.
[22] N. Touafek and E.M. Elsayed, On the solutions of systems of rational
difference equations, Mathematical and Computer Modelling, Vol. 55,
2012, pp. 1987–1997.
[23] S. Kalabusic, M.R.S. Kulenovic and E. Pilav, Dynamics of
a two-dimensional system of rational difference equations of
Leslie–Gower type, Advances in Difference Equations, 2011,
doi:10.1186/1687-1847-2011-29.
[1] M.P. Hassell and H.N. Comins, Discrete time models for two-species
competition, Theoretical Population Biology, Vol. 9, no. 2,1976, pp.
202–221.
[2] J.E. Franke and A.A. Yakubu, Mutual exclusion versus coexistence for
discrete competitive Systems, Journal of Mathematical Biology, Vol.30,
no. 2,1991, pp. 161–168.
[3] Marwan Aloqeili, Dynamics of a rational difference equation, Appl.
Math. Comput., Vol. 176, no. 2, 2006, pp. 768–774.
[4] C. Cinar, On the positive solutions of the difference equation xn+1 =
xn−1
1+xnxn−1
, Appl. Math. Compt. Vol.150, 2004, pp. 21–24.
[5] C. Cinar, On the positive solutions of the difference equation xn+1 =
xn−1
1+axnxn−1
, Appl. Math. Compt., Vol. 158, no.3,2004, pp. 809–812.
[6] C. Cinar, On the positive solutions of the difference equation xn+1 =
xn−1
−1+axnxn−1
, Appl. Math. Compt., Vol. 158, no.3, 2004, pp. 793–797.
[7] C. Cinar, On the positive solutions of the difference equation xn+1 =
axn−1
1+bxnxn−1
, Appl. Math. Compt., vol.156, 2004, pp. 587–590.
[8] B. Iricanin and S. Stevic, Some Systems of Nonlinear Difference Equations
of Higher Order with Periodic Solutions, Dynamics of Continuous,
Discrete and Impulsive Systems. Series A Mathematical Analysis, Vol.
13, No. 3-4, 2006, pp. 499–507.
[9] G. Papaschinopoulos and C.J. Schinas, On a system of two nonlinear
difference equations, J. Math. Anal. Appl. Vol. 219, 1998, pp. 415–426.
[10] D. Clark and M. R. S. Kulenovic, A coupled system of rational
difference equations, Comput Math Appl., Vol. 43, 2002, pp. 849–867
.
[11] D. Clark, M. R. S. Kulenovic and J. F. Selgrade, Global asymptotic
behavior of a two-dimensional difference equation modelling competition,
Nonlinear Analysis, Vol. 52, 2003, pp. 1765–1776.
[12] Q. Zhang, L. Yang and J. Liu, Dynamics of a system of rational
third-order difference equation, Advances in Difference Equations 2012,
2012: 136, pp. 1–8.
[13] J. Diblik, B. Iricanin, S. Stevic and Z. Smarda, On some symmetric
systems of difference equations, Abstract and Applied Analysis, Vol. 2013,
2013, Article ID 246723,pp. 1–7.
[14] Q. Din, M.N. Qureshi and A. Q. Khan, Dynamics of a
fourth-order system of rational difference equations, Advances in
Difference Equations, Vol.2012, 215, 2012, pp.1–15.
[15] T. F. Ibrahim and Q. Zhang, Stability of an anti-competitive system of
rational difference equations, Archives Des Sciences, Vol. 66, 2013, pp.
44–58.
[16] V.L. Kocic and G. Ladas, Global behavior of nonlinear difference
equations of higher order with application , Kluwer Academic Publishers,
Dordrecht, 1993.
[17] M.R.S. Kulenovic and O. Merino, Discrete dynamical systems and
difference equations with mathematica, Chapman and Hall/CRC, Boca
Raton, London, 2002.
[18] T.F. Ibrahim, Two-dimensional fractional system of nonlinear difference
equations in the modeling competitive populations, International Journal
of Basic & Applied Sciences, Vol.12, no. 05, 2012, pp. 103–121.
[19] K. Liu , Z. Zhao, X. Li and P. Li, More on three-dimensional systems of
rational difference equations, Discrete Dynamics in Nature and Society,
Vol. 2011, Article ID 178483, 2011.
[20] E.M.E. Zayed and M.A. El-Moneam, On the global attractivity of two
nonlinear difference equations, J. Math. Sci., Vol. 177, 2011, pp. 487–499.
[21] N. Touafek and E.M. Elsayed, On the periodicity of some systems of
nonlinear difference equations, Bull. Math. Soc. Sci. Math. Roumanie,
Vol. 2, 2012, pp. 217–224.
[22] N. Touafek and E.M. Elsayed, On the solutions of systems of rational
difference equations, Mathematical and Computer Modelling, Vol. 55,
2012, pp. 1987–1997.
[23] S. Kalabusic, M.R.S. Kulenovic and E. Pilav, Dynamics of
a two-dimensional system of rational difference equations of
Leslie–Gower type, Advances in Difference Equations, 2011,
doi:10.1186/1687-1847-2011-29.
@article{"International Journal of Engineering, Mathematical and Physical Sciences:67113", author = "Qianhong Zhang and Wenzhuan Zhang", title = "On the System of Nonlinear Rational Difference Equations", abstract = "This paper is concerned with the global asymptotic
behavior of positive solution for a system of two nonlinear rational
difference equations. Moreover, some numerical examples are given
to illustrate results obtained.
", keywords = "Difference equations, stability, unstable, global
asymptotic behavior.", volume = "8", number = "4", pages = "723-4", }
