The R-transform as power map and its generalizations to higher degree

IF 1.2 3区数学 Q1 MATHEMATICS

Finite Fields and Their Applications Pub Date : 2024-11-27 DOI:10.1016/j.ffa.2024.102546

Alp Bassa , Ricardo Menares

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引用次数: 0

Abstract

We give iterative constructions for irreducible polynomials over

F_{q}

of degree

n \cdot t^{r}

for all

r \geq 0

, starting from irreducible polynomials of degree n. The iterative constructions correspond modulo fractional linear transformations to compositions with power functions

x^{t}

. The R-transform introduced by Cohen is recovered as a particular case corresponding to

x^{2}

, hence we obtain a generalization of Cohen's R-transform (

t = 2

) to arbitrary degrees

t \geq 2

. Important properties like self-reciprocity and invariance of roots under certain automorphisms are deduced from invariance under multiplication by appropriate roots of unity. Extending to quadratic extensions of

F_{q}

we recover and generalize a recursive construction of Panario, Reis and Wang.

查看原文本刊更多论文

作为幂图的 R 变换及其对更高程度的概括

我们从 n 度的不可还原多项式出发，给出了所有 r≥0 的 n⋅tr Fq 上不可还原多项式的迭代构造。科恩引入的 R 变换作为与 x2 相对应的特殊情况被复原，因此我们得到了科恩 R 变换 (t=2) 对任意度 t≥2 的推广。从与适当的合一根相乘的不变性推导出了自还原性和根在某些自动形态下的不变性等重要性质。扩展到 Fq 的二次扩展，我们恢复并推广了帕纳里奥、雷斯和王的递归构造。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Finite Fields and Their Applications 数学-数学

CiteScore

2.00

自引率

20.00%

发文量

133

审稿时长

6-12 weeks

期刊介绍： Finite Fields and Their Applications is a peer-reviewed technical journal publishing papers in finite field theory as well as in applications of finite fields. As a result of applications in a wide variety of areas, finite fields are increasingly important in several areas of mathematics, including linear and abstract algebra, number theory and algebraic geometry, as well as in computer science, statistics, information theory, and engineering. For cohesion, and because so many applications rely on various theoretical properties of finite fields, it is essential that there be a core of high-quality papers on theoretical aspects. In addition, since much of the vitality of the area comes from computational problems, the journal publishes papers on computational aspects of finite fields as well as on algorithms and complexity of finite field-related methods. The journal also publishes papers in various applications including, but not limited to, algebraic coding theory, cryptology, combinatorial design theory, pseudorandom number generation, and linear recurring sequences. There are other areas of application to be included, but the important point is that finite fields play a nontrivial role in the theory, application, or algorithm.