Integral Basis for quartic Kummer extensions over Z[]
Abstract
Let K=Q[] and N=K[[4]α], α∈Z[], alpha=fg2h3, f, g, h∈ Z[] are pairwise coprime and square free. Let ON be the ring of integers of N. In this article we construct normalised integral basis for ON over Z[], that is an integral basis of the form \[ \1,f1(α)d1,f2(α)d2,f3(α)d3\ \] where di ∈ Z[i] and fi(X), ≤ i≤ 3 are monic polynomials of degree i over Z[]. We explicitly determine what di, 1≤ i≤ n-1 are in terms of f, g and h.
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