Irreducibility of Polynomials with Square Coefficients over Finite Fields

Abstract

We study a random polynomial of degree n over the finite field Fq, where the coefficients are independent and identically distributed and uniformly chosen from the squares in Fq. Our main result demonstrates that the likelihood of such a polynomial being irreducible approaches 1/n + O(q-1/2) as the field size q grows infinitely large. The analysis we employ also applies to polynomials with coefficients selected from other specific sets.

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