Nontrivial Galois module structure of cyclotomic fields |
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| Authors: | Marc Conrad Daniel R. Replogle. |
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| Affiliation: | Faculty of Technology, Southampton Institute, East Park Terrace, Southampton, S014 0YN Great Britain ; Department of Mathematics and Computer Science, College of Saint Elizabeth, 2 Convent Road, Morristown, New Jersey 07960 |
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| Abstract: | We say a tame Galois field extension  with Galois group  has trivial Galois module structure if the rings of integers have the property that  is a free ![$mathcal{O}_{K}[G]$](http://www.ams.org/mcom/2003-72-242/S0025-5718-02-01457-6/gif-abstract0/img4.gif) -module. The work of Greither, Replogle, Rubin, and Srivastav shows that for each algebraic number field other than the rational numbers there will exist infinitely many primes  so that for each there is a tame Galois field extension of degree  so that  has nontrivial Galois module structure. However, the proof does not directly yield specific primes  for a given algebraic number field  For  any cyclotomic field we find an explicit  so that there is a tame degree  extension  with nontrivial Galois module structure. |
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| Keywords: | Swan subgroups cyclotomic units Galois module structure tame extension normal integral basis |
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