References
- R. Abo-Zeid, Global behavior of a rational difference equation with quadratic term, Math. Morav. 18(1) (2014), pp. 81–88.
- R. Abo-Zeid, Global behavior of a fourth order difference equation, Acta Comment. Univ. Tartu. Math. 18(2) (2014), pp. 211–220. doi:10.12697/ACUTM.2014.18.18.
- R. Abo-Zeid, Global behavior of a third order rational difference equation, Math. Bohem. 139(1) (2014), pp. 25–37.
- R. Abo-Zeid, On the solutions of two third order recursive sequences, Armen. J. Math. 6(2) (2014), pp. 64–66.
- A. Aghajani, and Z. Shouli, On the asymptotic behavior of some difference equations by using invariants, Math. Sci. Quart. J. 4(1) (2010), pp. 29–38.
- R. Azizi, Global behaviour of the rational Riccati difference equation of order two: the general case, J. Difference Equ. Appl. 18(6) (2012), pp. 947–961. doi:10.1080/10236198.2010.532790.
- R. Azizi, Global behaviour of the higher order rational Riccati difference equation, preprint (2013).
- R. Azizi, On the global behaviour of some difference equations, Ph.D. thesis Faculty of Science of Bizerte, 2013.
- I. Bajo, Forbidden sets of planar rational systems of difference equations with common denominator, Appl. Anal. Discrete Math. 8(1) (2014), pp. 16–32. doi:10.2298/AADM131108022B.
- I. Bajo, Invariant quadrics and orbits for a family of rational systems of difference equations, Linear Algebra Appl. 449(0) (2014), pp. 500–511. doi:10.1016/j.laa.2014.02.043.
- I. Bajo, D. Franco, and J. Perán, Dynamics of a rational system of difference equations in the plane, Adv. Difference Equ. 2011(1) (2011), p. 958602. doi:10.1155/2011/958602.
- I. Bajo, and E. Liz, Periodicity on discrete dynamical systems generated by a class of rational mappings, J. Difference Equ. Appl. 12(12) (2006), pp. 1201–1212. doi:10.1080/10236190600949782.
- I. Bajo, and E. Liz, Global behaviour of a second-order nonlinear difference equation, J. Difference Equ. Appl. 17(10) (2011), pp. 1471–1486. doi:10.1080/10236191003639475.
- F. Balibrea, and A. Cascales, Eventually positive solutions in rational difference equations, Comput. Math. Appl. 64(7) (2012), pp. 2275–2281. doi:10.1016/j.camwa.2012.02.054.
- F. Balibrea, and A. Cascales, Studies on the difference equation xn+1=1/(xn+xn−2), J. Difference Equ. Appl. 18(4) (2012), pp. 607–625. doi:10.1080/10236198.2011.602344.
- E. Camouzis, and R. DeVault, The forbidden set of xn+1=p+(xn−1/xn), J. Difference Equ. Appl. 9(8) (2003), pp. 739–750. doi:10.1080/1023619021000042144.
- E. Camouzis, M.R.S. Kulenović, G. Ladas, and O. Merino, Rational systems in the plane, J. Difference Equ. Appl. 15(3) (2009), pp. 303–323. doi:10.1080/10236190802125264.
- E. Camouzis, and G. Ladas, Dynamics of third-order rational difference equations with open problems and conjectures, in Advances in Discrete Mathematics and Applications, 5, Taylor & Francis, 2007.
- A. Cascales, Ecuaciones en diferencias racionales, PhD thesis University of Murcia, March 2014.
- M. Csörnyei, and M. Laczkovich, Some periodic and non-periodic recursions, Monatsh. Math. 132(3) (2001), pp. 215–236.
- R. Devault, L. Galminas, E.J. Janowski, and G. Ladas, On the recursive sequence, J. Difference Equ. Appl. 6(1) (2000), pp. 121–125. doi:10.1080/10236190008808217.
- S. Elaydi, An introduction to difference equations, in Undergraduate Texts in Mathematics, Springer, 2005.
- P. Glendinning, and T. Hall, Zeros of the kneading invariant and topological entropy for Lorenz maps, Nonlinearity 9(4) (1996), pp. 999–1014. doi:10.1088/0951-7715/9/4/010.
- E.A. Grove, G. Ladas, L.C. McGrath, and C.T. Teixeira, Existence and behavior of solutions of a rational system, Commun. Appl. Nonlinear Anal. 8(1) (2001), pp. 1–25.
- E.A. Grove, and G.E. Ladas, Periodicities in nonlinear difference equations, in Advances in Discrete Mathematics and Applications Series, Chapman & Hall/CRC, 2005.
- J.H. Hubbard, and C.T. Sparrow, The classification of topologically expansive Lorenz maps, Comm. Pure Appl. Math. 43(4) (1990), pp. 431–443. doi:10.1002/cpa.3160430402.
- R. Khalaf-Allah, Asymptotic behavior and periodic nature of two difference equations, Ukrainian Math. J. 61(6) (2009), pp. 988–993. doi:10.1007/s11253-009-0249-2.
- M.R.S. Kulenović, and G.E. Ladas, Dynamics of Second Order Rational Difference Equations: With Open Problems and Conjectures, Chapman & Hall/CRC, 2002.
- E. Magnucka-Blandzi, and J. Popenda, On the asymptotic behavior of a rational system of difference equations, J. Difference Equ. Appl. 5(3) (1999), pp. 271–286. doi:10.1080/10236199908808187.
- L.C. McGrath, and C. Teixeira, Existence and behavior of solutions of the rational equation, xn+1=(axn−1+bxn)/(cxn−1+dxn)xn, n=0, 1, 2,…, Rocky Mountain J. Math. 36(2) (2006), pp. 649–674.
- F.J. Palladino, On invariants and forbidden sets. arXiv:1203.2170v2 2012.
- M. Ben H. Rhouma, Closed form solutions of some rational recursive sequences of second order, Comm. Appl. Nonlinear Anal. 12(2) (2005), pp. 41–58.
- J. Rubió-Massegú, On the existence of solutions for difference equations, J. Difference Equ. Appl. 13(7) (2007), pp. 655–664.
- J. Rubió-Massegú, Global periodicity and openness of the set of solutions for discrete dynamical systems, J. Difference Equ. Appl. 15(6) (2009), pp. 569–578.
- J. Rubió-Massegú, and V. Mañosa, Normal forms for rational difference equations with applications to the global periodicity problem, J. Math. Anal. Appl. 332(2) (2007), pp. 896–918.
- H. Sedaghat, Existence of solutions for certain singular difference equations, J. Difference Equ. Appl. 6(5) (2000), pp. 535–561. doi:10.1080/10236190008808245.
- H. Sedaghat, Nonlinear difference equations: theory with applications to social science models, in Mathematical Modelling: Theory and Applications, Springer, 2003.
- H. Sedaghat, Global behaviours of rational difference equations of orders two and three with quadratic terms, J. Difference Equ. Appl. 15(3) (2009), pp. 215–224. doi:10.1080/10236190802054126.
- H. Sedaghat, The higher order Riccati difference equation, preprint (2009).
- H. Shojaei et al., Stability and convergence of a higher order rational difference equation, Aust. J. Basic Appl. Sci. 11(5) (2011), pp. 72–77.
- S. Stević, On a system of difference equations, Appl. Math. Comput. 218(7) (2011), pp. 3372–3378. doi:10.1016/j.amc.2011.08.079.
- S. Stević, J. Diblík, B. IriČanin, and Z. Šmarda, On some solvable difference equations and systems of difference equations, Abstr. Appl. Anal. 2012 (2012), Article ID: 541761, 11 pages.10.1155/2012/541761.
- I. Szalkai, Avoiding forbidden sequences by finding suitable initial values, Int. J. Difference Equ. 3(2) (2008), pp. 305–315.
- Y. Yazlik, D. Tollu, and N. Taskara, On the solutions of difference equation systems with Padovan numbers, Appl. Math. 4(12) (2013), pp. 15–20. doi:10.4236/am.2013.412A002.
- Y. Yazlik, D. Tollu, and N. Taskara, On the solutions of two special types of Riccati difference equation via Fibonacci numbers, Adv. Difference Equ. 2013(1) (2013), p. 174. doi:10.1186/1687-1847-2013-174.