Steinitz classes of some abelian and nonabelian extensions of even degree

Alessandro Cobbe

Displaying similar documents to “Steinitz classes of some abelian and nonabelian extensions of even degree”

A classification of the extensions of degree $p^{2}$ over $ℚ_{p}$ whose normal closure is a $p$ -extension

Luca Caputo (2007)

Journal de Théorie des Nombres de Bordeaux

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Let $k$ be a finite extension of $ℚ_{p}$ and $ℰ_{k}$ be the set of the extensions of degree $p^{2}$ over $k$ whose normal closure is a $p$ -extension. For a fixed discriminant, we show how many extensions there are in $ℰ_{ℚ_{p}}$ with such discriminant, and we give the discriminant and the Galois group (together with its filtration of the ramification groups) of their normal closure. We show how this method can be generalized to get a classification of the extensions in $ℰ_{k}$ .

Hilbert-Speiser number fields and Stickelberger ideals

Humio Ichimura (2009)

Journal de Théorie des Nombres de Bordeaux

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Let $p$ be a prime number. We say that a number field $F$ satisfies the condition $(H_{p^{n}}^{'})$ when any abelian extension $N / F$ of exponent dividing $p^{n}$ has a normal integral basis with respect to the ring of $p$ -integers. We also say that $F$ satisfies $(H_{p^{\infty}}^{'})$ when it satisfies $(H_{p^{n}}^{'})$ for all $n \geq 1$ . It is known that the rationals $ℚ$ satisfy $(H_{p^{\infty}}^{'})$ for all prime numbers $p$ . In this paper, we give a simple condition for a number field $F$ to satisfy $(H_{p^{n}}^{'})$ in terms of the ideal class group of $K = F (ζ_{p^{n}})$ and a “Stickelberger ideal” associated to the...

Steinitz classes of a nonabelian extension of degree $p^{3}$

James Carter (1996)

Colloquium Mathematicae

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Absolute norms of $p$ -primary units

Supriya Pisolkar (2009)

Journal de Théorie des Nombres de Bordeaux

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We prove a local analogue of a theorem of J. Martinet about the absolute norm of the relative discriminant ideal of an extension of number fields. The result can be seen as a statement about $2$ -primary units. We also prove a similar statement about the absolute norms of $p$ -primary units, for all primes $p$ .

Conjugacy classes of series in positive characteristic and Witt vectors.

Sandrine Jean (2009)

Journal de Théorie des Nombres de Bordeaux

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Let $k$ be the algebraic closure of $𝔽_{p}$ and $K$ be the local field of formal power series with coefficients in $k$ . The aim of this paper is the description of the set $𝒴_{n}$ of conjugacy classes of series of order $p^{n}$ for the composition law. This work is concerned with the formal power series with coefficients in a field of characteristic $p$ which are invertible and of finite order $p^{n}$ for the composition law. In order to investigate Oort’s conjecture, I give a description of conjugacy classes of series...

Displaying similar documents to “Steinitz classes of some abelian and nonabelian extensions of even degree”

A classification of the extensions of degree p 2 over ℚ p whose normal closure is a p -extension

Hilbert-Speiser number fields and Stickelberger ideals

Steinitz classes of a nonabelian extension of degree p 3

Absolute norms of p -primary units

Conjugacy classes of series in positive characteristic and Witt vectors.

A classification of the extensions of degree $p^{2}$ over $ℚ_{p}$ whose normal closure is a $p$ -extension

Steinitz classes of a nonabelian extension of degree $p^{3}$

Absolute norms of $p$ -primary units