On irreducible divisors of iterated polynomials

被引:8
|
作者
Gomez-Perez, Domingo [1 ]
Ostafe, Alina [2 ]
Shparlinski, Igor E. [3 ]
机构
[1] Univ Cantabria, Dept Math, E-39005 Santander, Spain
[2] Univ New S Wales, Sch Math & Stat, Sydney, NSW 2052, Australia
[3] Macquarie Univ, Dept Comp, Sydney, NSW 2109, Australia
来源
REVISTA MATEMATICA IBEROAMERICANA | 2014年 / 30卷 / 04期
关键词
iterations of polynomials; irreducible divisors; FINITE-FIELDS; QUADRATIC POLYNOMIALS; GALOIS THEORY;
D O I
10.4171/RMI/809
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
D. Gomez-Perez, A. Ostafe, A. P. Nicolas and D. Sadornil have recently shown that for almost all polynomials f is an element of F-q[X] over the finite field of q elements, where q is an odd prime power, their iterates eventually become reducible polynomials over IF,. Here we combine their method with some new ideas to derive finer results about the arithmetic structure of iterates of f. In particular, we prove that the nth iterate of f has a square-free divisor of degree of order at least n(1+0) (1) as n -> infinity (uniformly in q).
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页码:1123 / 1134
页数:12
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