On the index of special perfect polynomials

Authors

  • L.H. Gallardo Laboratoire de Mathématiques de Bretagne Atlantique, University of Western Brittany, 6 Av. Le Gorgeu, F-29238 Brest, France
https://doi.org/10.15330/cmp.15.2.507-513

Keywords:

cyclotomic polynomial, characteristic $2$, special perfect polynomial, factorization
Published online: 2023-12-11

Abstract

We give a lower bound of the degree and the number of distinct prime divisors of the index of special perfect polynomials. More precisely, we prove that $\omega(d) \geq 9,$ and $\deg(d) \geq 258$, where $d := \gcd(Q^2,\sigma(Q^2))$ is the index of the special perfect polynomial $A := p_1^2 Q^2$, in which $p_1$ is irreducible and has minimal degree. This means that $ \sigma(A)=A$ in the polynomial ring ${\mathbb{F}}_2[x]$. The function $\sigma$ is a natural analogue of the usual sums of divisors function over the integers. The index considered is an analogue of the index of an odd perfect number, for which a lower bound of $135$ is known. Our work use elementary properties of the polynomials as well as results of the paper [J. Théor. Nombres Bordeaux 2007, 19 (1), 165$-$174].

Article metrics
How to Cite
(1)
Gallardo, L. On the Index of Special Perfect Polynomials. Carpathian Math. Publ. 2023, 15, 507-513.