Christian Bagshaw
Published 2022-01-17, updated 2022-01-26Version 2
Building upon the work of A. Booker and C. Pomerance (2017), we prove that for a prime power $q \geq 7$, every residue class modulo an irreducible polynomial $F \in \mathbb{F}_q[X]$ has a non-constant, square-free representative which has no irreducible factors of degree exceeding $\text{deg}~F -1$. We also give applications to generating sequences of irreducible polynomials.
Comments: Updated after discovering a typo in a cited paper
Irreducible polynomials with several prescribed coefficients
Generators of the group of modular units for Gamma1(N) over QQ
From $r$-Linearized Polynomial Equations to $r^m$-Linearized Polynomial Equations
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