Monogenic Reciprocal Quartic Polynomials And Their Galois Groups

Abstract

Suppose that f(x)=x4+Ax3+Bx2+Ax+1∈ Z[x]. We say that f(x) is monogenic if f(x) is irreducible over Q and \1,θ,θ2,θ3\ is a basis for the ring of integers of Q(θ), where f(θ)=0. For each possible Galois group G that can occur in the two cases of A 0 with B=0, and AB 0, we determine all monogenic polynomials f(x) with Galois group G.

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