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| When Does a Polynomial Over a Finite Field Permute the Elements of the Field? | |
| Rudolf Lidl; Gary L. Mullen | |
| 1988 | |
| Source | The American Mathematical Monthly
 |
| Volume | 95Issue:3Pages:243-246 |
| English Abstract | We present a class of indecomposable polynomials of non prime-power degree over the finite field of two elements which are permutation polynomials on infinitely many finite extensions of the field. The associated geometric monodromy groups are the simple ... |
| Indexed Type | 其他 |
| Cooperation Status | 其它 |
| Language | 英语 |
| Content Type | 期刊论文 |
| URI | http://ir.iscas.ac.cn/handle/311060/1365 |
| Collection | 中国科学院软件研究所 |
| Recommended Citation GB/T 7714 | Rudolf Lidl,Gary L. Mullen. When Does a Polynomial Over a Finite Field Permute the Elements of the Field?[J]. The American Mathematical Monthly,1988,95(3):243-246. |
| APA | Rudolf Lidl,&Gary L. Mullen.(1988).When Does a Polynomial Over a Finite Field Permute the Elements of the Field?.The American Mathematical Monthly,95(3),243-246. |
| MLA | Rudolf Lidl,et al."When Does a Polynomial Over a Finite Field Permute the Elements of the Field?".The American Mathematical Monthly 95.3(1988):243-246. |
| Files in This Item: | ||||||
| File Name/Size | DocType | Version | Access | License | ||
| bj01151402.pdf(237KB) | 开放获取 | License | Application Full Text | |||
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