A complement to the note by Lassina Dembélé ``A non-solvable Galois extension of \(\mathbb Q\) ramified at 2 only'' (Q1004534)
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scientific article; zbMATH DE number 5527929
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | A complement to the note by Lassina Dembélé ``A non-solvable Galois extension of \(\mathbb Q\) ramified at 2 only'' |
scientific article; zbMATH DE number 5527929 |
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A complement to the note by Lassina Dembélé ``A non-solvable Galois extension of \(\mathbb Q\) ramified at 2 only'' (English)
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11 March 2009
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In the previous paper by \textit{L. Dembélé} [C. R., Math., Acad. Sci. Paris 347, No. 3--4, 111--116 (2009; Zbl 1166.11038)], the degree of the exhibited extension \(K/\mathbb Q\) is high: \([K: \mathbb Q]= 2^{19}(3.5.17.257)^2\), while the root discriminant of \(K\) is small: \(\delta_K< 58,688\ldots\). This majoration already improves best known examples by \textit{F. Hajir} and \textit{C. Maire} [J. Symb. Comput. 33, No. 4, 415--423 (2002; Zbl 1086.11051)]. Here, in a few elegant lines, Serre brings down the bound to \(\delta_K< 55,304388\ldots\).
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discriminant
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