AbstractThe structure of ideal class groups of number fields is investigated in the following three cases: (i) Abelian extensions of number fields whose Galois groups are of type (p, p); (ii) non-Galois extensions Q(pd03,pd13) of degree p2 over Q; (iii) dihedral extensions of degree 2n + 1 over Q. It is shown that it is possible to obtain class number relations by group-theoretic methods. Subgroups of ideal class groups whose orders are prime to the extension degree are considered
AbstractLet K be an unramified abelian extension of a number field F with Galois group G. We conside...
Let G be a finite group and K a number field with ring of integers O_K. In this thesis we study seve...
International audienceWe give, in Sections 2 and 3, an english translation of: Classes généralisées ...
AbstractThe structure of ideal class groups of number fields is investigated in the following three ...
It is well known that the Galois group of an extension L/F puts con-straints on the structure of the...
AbstractLet k be a number field, l be a prime number, Γ be a group of order l; assume that k and the...
AbstractStarting from a base field with properties similar to those of the rational numbers, the str...
AbstractStarting from a base field with properties similar to those of the rational numbers, the str...
AbstractLet k be a number field and Ok its ring of integers. Let l be a prime number and m a natural...
AbstractLet K be an algebraic number field, ο=OK its ring of integers, and G an elementary abelian g...
Let K/k be a normal extension of algebraic number fields whose Galois group G is a Frobenius group. ...
AbstractLetKbe a real abelian number field satisfying certain conditions andKnthenth layer of the cy...
Let Q be the rational number field. For any algebraic number field k of finite degree over Q, we sha...
Almost 20 years ago, W. Narkiewicz posed the problem to give an arithmetical characterization of the...
Two number fields having the same Dedekind Zeta function need not have isomorphic class groups. Howe...
AbstractLet K be an unramified abelian extension of a number field F with Galois group G. We conside...
Let G be a finite group and K a number field with ring of integers O_K. In this thesis we study seve...
International audienceWe give, in Sections 2 and 3, an english translation of: Classes généralisées ...
AbstractThe structure of ideal class groups of number fields is investigated in the following three ...
It is well known that the Galois group of an extension L/F puts con-straints on the structure of the...
AbstractLet k be a number field, l be a prime number, Γ be a group of order l; assume that k and the...
AbstractStarting from a base field with properties similar to those of the rational numbers, the str...
AbstractStarting from a base field with properties similar to those of the rational numbers, the str...
AbstractLet k be a number field and Ok its ring of integers. Let l be a prime number and m a natural...
AbstractLet K be an algebraic number field, ο=OK its ring of integers, and G an elementary abelian g...
Let K/k be a normal extension of algebraic number fields whose Galois group G is a Frobenius group. ...
AbstractLetKbe a real abelian number field satisfying certain conditions andKnthenth layer of the cy...
Let Q be the rational number field. For any algebraic number field k of finite degree over Q, we sha...
Almost 20 years ago, W. Narkiewicz posed the problem to give an arithmetical characterization of the...
Two number fields having the same Dedekind Zeta function need not have isomorphic class groups. Howe...
AbstractLet K be an unramified abelian extension of a number field F with Galois group G. We conside...
Let G be a finite group and K a number field with ring of integers O_K. In this thesis we study seve...
International audienceWe give, in Sections 2 and 3, an english translation of: Classes généralisées ...
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