Weclassify all the number fields with signature (4,2), (6,1), (1,4) and (3,3) having discriminant lower than a specific upper bound. This completes the search for minimum discriminants for fields of degree 8 and continues it in the degree 9 case. We recall the theoretical tools and the algorithmic steps upon which our procedure is based, then we focus on the novelties due to a new implementation of this process on the computer algebra system PARI/GP;finally, we make some remarks about the final results, among which the existence of a number field with signature (3,3) and small discriminant which was not previously known.
Battistoni, F., On small discriminants of number fields of degree 8 and 9, <<JOURNAL DE THÉORIE DES NOMBRES DE BORDEAUX>>, 2020; 32 (2): 489-501 [https://hdl.handle.net/10807/270242]
On small discriminants of number fields of degree 8 and 9
Battistoni, Francesco
Primo
2020
Abstract
Weclassify all the number fields with signature (4,2), (6,1), (1,4) and (3,3) having discriminant lower than a specific upper bound. This completes the search for minimum discriminants for fields of degree 8 and continues it in the degree 9 case. We recall the theoretical tools and the algorithmic steps upon which our procedure is based, then we focus on the novelties due to a new implementation of this process on the computer algebra system PARI/GP;finally, we make some remarks about the final results, among which the existence of a number field with signature (3,3) and small discriminant which was not previously known.
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