Deutsche Übersetzung des Titels: Iwasawa-Theorie p-adischer Lie-Erweiterungen
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Übersetzung des Abstracts (Englisch)
The Iwasawa theory of p-adic Lie groups investigates arithmetic objects above infinite field extensions of a number field k whose Galois group is a p-adic analytic group. The most prominent example (due to Serre) is produced by adjoining the p-torsion points of an elliptic curve defined over k without complex multiplication. The strategy consists in considering the Selmer Group or other cohomology groups which 'live' above the p-adic Lie extension as a module over the (non-commutative) group algebra R of G with coefficients in the p-adic integers. In the first, algebraic part of this dissertation special properties of R and of finitely generated R-modules are studied. In particular, we introduce the notation of pseudo-null modules as well as pseudo-isomorphisms, which turn out to be essential for structure theorems of R-modules. Then a local duality theorem and the Auslander-Buchsbaum equality for R are proved. In the second, arithmetic part we show the existence of certain pseudo-isomorphisms of global Iwasawa modules, we study the µ-invariant and we prove for some Galois modules that they do not contain any non-trivial pseudo-null submodules.
Dokumententyp: | Dissertation |
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Erstgutachter: | Wingberg, Prof. Dr. Kay |
Tag der Prüfung: | 14 März 2001 |
Erstellungsdatum: | 28 Mrz. 2001 00:00 |
Erscheinungsjahr: | 2001 |
Institute/Einrichtungen: | Fakultät für Mathematik und Informatik > Institut für Mathematik |
DDC-Sachgruppe: | 510 Mathematik |
Normierte Schlagwörter: | Iwasawa-Theorie, Galois-Kohomologie, Lokale Kohomologie, Elliptische Kurve |
Freie Schlagwörter: | Abelsche Varietät , Auslander reguläre Ringe , Auslander-Buchsbaum GleichungAbelean variety , Auslander regular ring , Galois-Cohomology , Auslander-Buchsbaum equality |