The Galois Group of x2p+bxp+cp over Q
Abstract
We prove an irreducibility criterion for polynomials of the form h(x)=x2m + bxm + c1 ∈ F[x] relating to the Dickson polynomials of the first kind Dp. In the case when F = Q, m is a prime p>3, and c1=cp, for c∈Q, we explicitly determine the Galois group of dh= Dp(x, c) + b, which is Aff(Fp) or Cp C(p - 1)/2 Aff(Fp), and the Galois group of h, which is C2 × Aff(Fp), Aff(Fp), or C2 × (Cp C(p - 1)/2) C2 × Aff(Fp).
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