The 3-sparsity of Xn-1 over finite fields

Abstract

Let q be a prime power and Fq the finite field with q elements. For a positive integer n, the binomial Xn - 1 ∈ Fq[X] is said to be 3-sparse over Fq if every irreducible factor of Xn-1 in Fq[X] is either a binomial or a trinomial. In 2021, Oliveira and Reis characterized all positive integers n for which Xn-1 is 3-sparse over Fq when q = 2 and q = 4, and raised the open problem of whether, for any given q, there are only finitely many primes p such that Xp-1 is 3-sparse over Fq. In this paper, if q is a power of an odd prime r, we then establish that for any positive integer not divisible by r, Xn-1 is 3-sparse over Fq if and only if n =p1e1 ·s pses for some nonnegative integers e1, …, es, where p1, …, ps are distinct prime divisors of q2 - 1. This resolves the problem posed by Oliveira and Reis for odd characteristic.