Anbar Meidl, Nurdagül and Kaşıkçı, Canan (2021) Permutations polynomials of the form G(X)(k) - L(X) and curves over finite fields. Cryptography and Communications . ISSN 1936-2447 (Print) 1936-2455 (Online) Published Online First http://dx.doi.org/10.1007/s12095-020-00465-9
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Official URL: http://dx.doi.org/10.1007/s12095-020-00465-9
Abstract
For a positive integer k and a linearized polynomial L(X), polynomials of the form P(X) = G(X)(k) - L(X) is an element of F-qn [X] are investigated. It is shown that when L has a non-trivial kernel and G is a permutation of F-qn, then P(X) cannot be a permutation if gcd( k, q(n) - 1) > 1. Further, necessary conditions for P(X) to be a permutation of F-qn are given for the case that G(X) is an arbitrary linearized polynomial. The method uses plane curves, which are obtained via the multiplicative and the additive structure of F-qn, and their number of rational affine points.
| Item Type: | Article |
|---|---|
| Uncontrolled Keywords: | Curves/function fields; Permutation polynomials; Rational points/places |
| Subjects: | Q Science > QA Mathematics > QA150-272.5 Algebra |
| Divisions: | Faculty of Engineering and Natural Sciences > Basic Sciences > Mathematics Faculty of Engineering and Natural Sciences |
| Depositing User: | Nurdagül Anbar Meidl |
| Date Deposited: | 20 Feb 2021 17:36 |
| Last Modified: | 22 Mar 2021 19:08 |
| URI: | https://research.sabanciuniv.edu/id/eprint/41298 |
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