Local Leopoldt's problem for rings of integers in Abelian $p$-extensions of complete discrete valuation fields
Documenta mathematica, Tome 5 (2000), pp. 657-693
Using the standard duality we construct a linear embedding of an associated module for a pair of ideals in an extension of a Dedekind ring into a tensor square of its fraction field. Using this map we investigate properties of the coefficient-wise multiplication on associated orders and modules of ideals. This technique allows to study the question of determining when the ring of integers is free over its associated order. We answer this question for an Abelian totally wildly ramified p-extension of complete discrete valuation fields whose different is generated by an element of the base field. We also determine when the ring of integers is free over a Hopf order as a Galois module.
Classification :
11S15, 11S20, 11S31
Mots-clés : complete discrete valuation (local) fields, additive Galois modules, formal groups, associated Galois modules
Mots-clés : complete discrete valuation (local) fields, additive Galois modules, formal groups, associated Galois modules
@article{10_4171_dm_91,
author = {M.V. Bondarko},
title = {Local {Leopoldt's} problem for rings of integers in {Abelian} $p$-extensions of complete discrete valuation fields},
journal = {Documenta mathematica},
pages = {657--693},
year = {2000},
volume = {5},
doi = {10.4171/dm/91},
url = {http://geodesic.mathdoc.fr/articles/10.4171/dm/91/}
}
TY - JOUR AU - M.V. Bondarko TI - Local Leopoldt's problem for rings of integers in Abelian $p$-extensions of complete discrete valuation fields JO - Documenta mathematica PY - 2000 SP - 657 EP - 693 VL - 5 UR - http://geodesic.mathdoc.fr/articles/10.4171/dm/91/ DO - 10.4171/dm/91 ID - 10_4171_dm_91 ER -
M.V. Bondarko. Local Leopoldt's problem for rings of integers in Abelian $p$-extensions of complete discrete valuation fields. Documenta mathematica, Tome 5 (2000), pp. 657-693. doi: 10.4171/dm/91
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