On some algebraic difference equations u(n+2)u(n+1) = Psi(u(n+1)) in R-*(+), related to families of conics or cubics: generalization of the Lyness' sequences

Bastien G; Rogalski M

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On some algebraic difference equations u(n+2)u(n+1) = Psi(u(n+1)) in R-*(+), related to families of conics or cubics: generalization of the Lyness' sequences

机译：在某些R-*（+）中的代数差分方程u（n + 2）u（n + 1）= Psi（u（n + 1））中，与圆锥或三次方族有关：Lyness'序列的一般化

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In this paper and in a forthcoming one, we study difference equations in R-*(+) of the types[GRAPHICS]which are linked to families of conics, cubics and quartics, respectively. These equations generalize Lyness' one u(n)+2(u)n = a + u(n+l) studied in several papers, whose behavior was completely elucidated in [G. Bastien, M. Rogalski, in press] through methods which are transposed in the present paper for the study of (1) and (2), and in the forthcoming one for (3). In particular we prove in the present paper a form of chaotic behavior for solutions of difference equations (1) and (2), and find all the possible periods for these solutions.

机译：在本文中以及即将发表的文章中，我们研究了[GRAPHICS]类型的R-*（+）中的差分方程，它们分别与圆锥，三次方和四次方族相关。这些方程概括了Lyness'u（n）+2（u）n = a + u（n + 1），在几篇论文中进行了研究，其行为已在[G. Bastien，M. Rogalski，印刷中]通过本文中用于研究（1）和（2）以及即将出版的用于（3）的方法进行转换。特别地，我们在本文中证明了差分方程（1）和（2）的解的一种混沌行为，并找到了这些解的所有可能周期。

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《Journal of Mathematical Analysis and Applications》 |2004年第2期|共31页
作者
Bastien G; Rogalski M;
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正文语种 eng
中图分类数学;
关键词
dynamical systems; difference equations; Lyness sequence; periods;

机译：动力系统;差分方程;Lyness序列;周期;

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1. On some algebraic difference equations u(n+2)u(n+1) = Psi(u(n+1)) in R-*(+), related to families of conics or cubics: generalization of the Lyness' sequences [J] . Bastien G, Rogalski M Journal of Mathematical Analysis and Applications . 2004,第2期

机译：在某些R-*（+）中的代数差分方程u（n + 2）u（n + 1）= Psi（u（n + 1））中，与圆锥或三次方族有关：Lyness'序列的一般化
2. Global behavior of the solutions of Lyness' difference equation u(n+2)u(n) = u(n+1)+a [J] . Bastien G, Rogalski M Journal of difference equations and applications . 2004,第11期

机译：Lyness'差分方程解的全局行为U（n + 2）U（n）= u（n + 1）+ a
3. ON A SYSTEM OF RATIONAL DIFFERENCE EQUATIONS x_(n+1) = x_(n-1)/y_n x_(n-1)-1, y_(n+1)=y_(n-1)/x_n y_(n-1)-1,z_(n+1)=1/y_n z_(n+1) [J] . K. Liu, P. Li, W. Zhong Fasciculi mathematici . 2013,第51期

机译：在有理差分方程组上x_（n + 1）= x_（n-1）/ y_n x_（n-1）-1，y_（n + 1）= y_（n-1）/ x_n y_（n- 1）-1，z_（n + 1）= 1 / y_n z_（n + 1）
4. On The Periodic Solutions of the Difference Equations x_(n+1) = a + b(x_n/x_(n-1)) and x_(n+1) = a + b(x_(n-1)/x_n) + c(x_n/x_(n-1)) [C] . Seifedine Kadry International Conference of Numerical Analysis and Applied Mathematics . 2016

机译：在差分方程的周期解x_（n + 1）= a + b（x_n / x_（n-1））和x_（n + 1）= a + b（x_（n-1）/ x_n）+ C（X_N / X_（N-1））
5. On some algebraic difference equations un+2un=ψ(un+1) in R*+, related to families of conics or cubics: generalization of the Lyness' sequences [O] . Bastien G., Rogalski M. 2004

机译：在一些R * +中的代数差分方程un + 2un =ψ（un + 1）上，与圆锥形或三次形族相关：Lyness'序列的一般化

On some algebraic difference equations u(n+2)u(n+1) = Psi(u(n+1)) in R-*(+), related to families of conics or cubics: generalization of the Lyness' sequences

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