English

Nilpotent linearized polynomials over finite fields and applications

Number Theory 2016-09-30 v1

Abstract

Let qq be a prime power and Fqn\mathbb F_{q^n} be the finite field with qnq^n elements, where n>1n>1. We introduce the class of the linearized polynomials L(x)L(x) over Fqn\mathbb F_{q^n} such that L(t)(x):=L(L((x)))ttimes0(modxqnx)L^{(t)}(x):=\underbrace{L(L(\cdots(x)\cdots))}_{t \quad\text{times}}\equiv 0\pmod {x^{q^n}-x} for some t2t\ge 2, called nilpotent linearized polynomials (NLP's). We discuss the existence and construction of NLP's and, as an application, we show how to construct permutations of Fqn\mathbb F_{q^n} from these polynomials. For some of those permutations, we can explicitly give the compositional inverse map and the cycle structure. This paper also contains a method for constructing involutions over binary fields with no fixed points, which are useful in block ciphers.

Keywords

Cite

@article{arxiv.1609.09379,
  title  = {Nilpotent linearized polynomials over finite fields and applications},
  author = {Lucas Reis},
  journal= {arXiv preprint arXiv:1609.09379},
  year   = {2016}
}

Comments

12 pages

R2 v1 2026-06-22T16:05:30.577Z