2) recursive sequence
递推序列
1.
This paper proves that the Diophantine Equation has only positive integral solution with the methods of recursive sequence,congruence and quadratic remainder.
利用一种初等的证明方法,即递推序列、同余式和平方剩余的方法,对不定方程x2-11y4=38的正整数解进行了研究,证明了不定方程x2-11y4=38仅有正整数解(x,y)=(7,1)。
2.
In this paper the author has proved that the Diophantine equation x2-3y4=22 has only positive integral solutions(x,y) =(5,1),(85,7) with the methods of recursive sequence,congruence and quadratic remainder.
利用一种初等的证明方法,即递推序列,同余式和平方剩余的方法,对一个不定方程x2-3y4=22的正整数解进行了研究,证明了不定方程x2-3y4=22仅有正整数解(x,y)=(5,1),(85,7)。
3) Recurrence sequence
递推序列
1.
For the special recurrence sequence {a_n}, the characteristic polynomial of which is C(x)=(x-1)r ,the article give a general solution of that and an abundant and essential condition of judging that:existing integer r:r≥1,for whichever n≥0, Δra_n=0 is certainly be obtained.
对于特征多项式为C(x) =(x- 1) r的特殊递推序列an,给出了它的通解求法以及判定它的充要条件 :存在整数r≥ 1,对任意的n≥ 0 ,Δran =0成立。
4) counterorder iteration
逆序递推法
1.
While giving rigid proving for the basic theory of dynamic program (optimization theory) in solving multistage decision problems, the paper introduces dynamic program basic methods by examples-the specific apllications of counterorder iterations.
本文在对求解多阶段决策问题的动态规划的基本理论—最优性原理进行严格证明的同时还通过实例介绍了动态规划的基本方法—逆序递推法的具体应
5) linear recurrence sequences
线性递推序列
1.
In this paper an arithmetic property of linear recurrence sequences with variable coefficients is given which is analogue to the case of linear recurrence sequences with constant coefficiellts.
我们给出变系数线性递推序列的一个算术性质,它类似于常系数线性递推序列的情形。
6) On Recurrence sequence of order three
三阶递推序列
补充资料:递归序列
递归序列
recursive sequence
递归序列【re皿叙s闪.叮犯e或rec~nt sequence;的3-BPaT“叨noc月e压oBaTe几I.H0cT‘」 一个序列“。,“,,…,满足关系式 a。+,+自“。+p一!+”’+cl,“,一0,其中cl,…,c,是一些常数·如果己知前p项,则根据上述关系式可以依次算出其余各项.递归序列的一成嘴睽蜘好是Fi加nacci)抑Ul,l,2,3,5,8,一(a。*:=。,.*,+a。,。、,=。、=1).一个递归级数是一个幂级数(Power series)。。+“;x+“Zx’+…,其系数构成递归序列.这种级数表示处处有定义的有理函数. BC3一3【补注1从多方面研究递归序列的一篇很好的参考文献是〔Al].
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参考词条