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On counting rings of integers as Galois modules
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A. Agboola
Published/Copyright:
June 3, 2011
Abstract
Let K be a number field and G a finite abelian group. We study the asymptotic behaviour of the number of tamely ramified G-extensions of K with ring of integers of fixed realisable class as a Galois module.
Received: 2009-11-20
Revised: 2010-08-17
Published Online: 2011-06-03
Published in Print: 2012-02
©[2012] by Walter de Gruyter Berlin Boston
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- On counting rings of integers as Galois modules
- On the boundary behaviour of the Hardy spaces of Dirichlet series and a frame bound estimate
- Invariance of Gromov–Witten theory under a simple flop
- Representations up to homotopy of Lie algebroids
- Counting lattice points
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Articles in the same Issue
- On counting rings of integers as Galois modules
- On the boundary behaviour of the Hardy spaces of Dirichlet series and a frame bound estimate
- Invariance of Gromov–Witten theory under a simple flop
- Representations up to homotopy of Lie algebroids
- Counting lattice points
- Cyclic homology of strong smash product algebras
- Ancient solutions of Ricci flow on spheres and generalized Hopf fibrations
