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Explicit Constructions of the non-Abelian $p^3$-Extensions Over $\QQ$

Published 2008-06-13, updated 2008-09-23Version 6

Let $p$ be an odd prime. Let $F/k$ be a cyclic extension of degree $p$ and of characteristic different from $p$. The explicit constructions of the non-abelian $p^{3}$-extensions over $k$, are induced by certain elements in ${F(\mu_{p})}^{*}$. In this paper we let $k=\QQ$ and present sufficient conditions for these elements to be suitable for the constructions. Polynomials for the non-abelian groups of order 27 over $\QQ$ are constructed.

Comments: 10 pages. Keywords: Constructive Galois Theory; Heisenberg group, Explicit Embedding problem. Corrections: we revised the proof of Theorem 3.1

Categories: math.NT

Subjects: 12F12, 11R18

Keywords: explicit constructions, odd prime, cyclic extension, sufficient conditions, non-abelian groups

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arXiv:0806.2202 [math.NT]Abstract References Reviews Resources

Explicit Constructions of the non-Abelian $p^3$-Extensions Over $\QQ$

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Explicit Constructions of the non-Abelian $p^3$-Extensions Over $\QQ$

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