The monogenicity and Galois groups of certain reciprocal quintinomials

Abstract

We say that a monic polynomial f(x)∈ Z[x] of degree N is monogenic if f(x) is irreducible over Q and \1,θ,θ2,… ,θN-1\ is a basis for ZK, the ring of integers of K= Q(θ), where f(θ)=0. For n 2, we define the reciprocal quintinomial \[ Fn,A,B(x):=x2n+Ax3· 2n-2+Bx2n-1+Ax2n-2+1∈ Z[x].\] In this article, we extend our previous work on the monogenicity of Fn,A,B(x) to treat the specific previously-unaddressed situation of A B 14. Moreover, we determine the Galois group over Q of Fn,A,B(x) in special cases.

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