On the degrees of which there exist no self-reciprocal binary irreducible pentanomials

Wang Jiantao; Zheng Dong; Huang Zheng

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On the degrees of which there exist no self-reciprocal binary irreducible pentanomials

机译：关于其中没有自互相二元不可缩短的五旬节的程度

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Omran Ahmadi proved that if a number n is divisible by 12, there is no self-reciprocal irreducible pentanomial of degree n over F-2. We found new sets of numbers holding this property, including the numbers n = 2 . 3(k), k = 1. As the degrees are all integers, a new observation on the degrees of which there exist no self-reciprocal binary irreducible pentanomials from the Ulam spiral is also presented.

机译：Omran Ahmadi证明了，如果一个数n可被12整除，则F-2上不存在n阶的自倒数不可约五项式。我们发现了一组新的具有这个性质的数，包括n=2的数。3（k），k；=1.由于度都是整数，本文还对乌拉姆螺旋中不存在自倒数二元不可约五项式的度进行了新的观察。

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来源
《Utilitas mathematica》 |2018年第2018期|共6页
作者
Wang Jiantao; Zheng Dong; Huang Zheng;
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作者单位

Shanghai Jiao Tong Univ Sch Informat Secur Engn Shanghai 200240 Peoples R China;

Xian Univ Posts &

Telecommun Natl Engn Lab Wireless Secur Xian 710121 Shaanxi Peoples R China;

Shanghai Jiao Tong Univ Sch Informat Secur Engn Shanghai 200240 Peoples R China;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
Self-reciprocal Polynomial; Irreducible Pentanomial; Finite Fields;

机译：自互互易多项式;不可减少的五宣传;有限田地;

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机译：关于其中没有自互相二元不可缩短的五旬节的程度
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10. Minimal Faithful Permutation Degrees for Irreducible Coxeter Groups and Binary Polyhedral Groups [O] . Saunders, Neil 2014

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11. Analysis of a Degree Compatibility Test for Polynomial Irreducibility. [R] . Musser, D. R. 1975

机译：多项式不可约性的度相容性检验分析。

On the degrees of which there exist no self-reciprocal binary irreducible pentanomials

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