On Monogeneity of reciprocal polynomials
Abstract
Let ZK denote the ring of integers of the number field K = Q(θ), where θ is a root of the monic irreducible polynomial f(x) ∈ Z[x]. We say that f(x) is monogenic if ZK = Z[θ]. A polynomial f(x) ∈ Z[x] is called reciprocal if f(x) = xdeg(f) f(1/x). In this article, we derive sufficient conditions for the monogeneity of even degree reciprocal polynomials. By employing properties of the discriminant of reciprocal polynomials, we partially prove a conjecture proposed by Jones in 2021. Furthermore, we establish a lower bound on the number of certain sextic monogenic reciprocal polynomials.
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