VALUATIONS ON VECTOR SPACES AS A GENERALIZATION OF VALUATIONS ON FIELDS

VALUATIONS ON VECTOR SPACES AS A GENERALIZATION OF VALUATIONS ON FIELDS

This dissertation deals with valuations on vector spaces as a generalization of valuations on fields. The resulting contribution is formulation the concept of valuations <br /> <br /> <br /> on vector spaces as a generalization of valuations on fields. <br /> <br />...

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Main Author: EFRINITA IRWAN (30113010), SRI
Format: Dissertations
Language:Indonesia
Online Access:https://digilib.itb.ac.id/gdl/view/24360
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Institution: Institut Teknologi Bandung
Language: Indonesia
id id-itb.:24360
spelling id-itb.:243602017-09-27T15:45:36ZVALUATIONS ON VECTOR SPACES AS A GENERALIZATION OF VALUATIONS ON FIELDS EFRINITA IRWAN (30113010), SRI Indonesia Dissertations INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/24360 This dissertation deals with valuations on vector spaces as a generalization of valuations on fields. The resulting contribution is formulation the concept of valuations <br /> <br /> <br /> on vector spaces as a generalization of valuations on fields. <br /> <br /> <br /> The main result of the dissertation is an interrelation between valuation modules and valuations on vector spaces. This result obtained as a generalization of the <br /> <br /> <br /> similar study in ring theory. This study is restricted to the class of torsion-free reduced modules. <br /> <br /> <br /> In the next discussion, it is shown that it can be constructed a topology on a reduced valuation module using the corresponding valuation on the module. As <br /> <br /> <br /> a result, every reduced valuation module is a topological module. Further, we use the results to study the completion of valuation modules. Particularly, investigated the completion of torsion-free reduced modules over discrete valuation rings. text
institution Institut Teknologi Bandung
building Institut Teknologi Bandung Library
continent Asia
country Indonesia
Indonesia
content_provider Institut Teknologi Bandung
collection Digital ITB
language Indonesia
description This dissertation deals with valuations on vector spaces as a generalization of valuations on fields. The resulting contribution is formulation the concept of valuations <br /> <br /> <br /> on vector spaces as a generalization of valuations on fields. <br /> <br /> <br /> The main result of the dissertation is an interrelation between valuation modules and valuations on vector spaces. This result obtained as a generalization of the <br /> <br /> <br /> similar study in ring theory. This study is restricted to the class of torsion-free reduced modules. <br /> <br /> <br /> In the next discussion, it is shown that it can be constructed a topology on a reduced valuation module using the corresponding valuation on the module. As <br /> <br /> <br /> a result, every reduced valuation module is a topological module. Further, we use the results to study the completion of valuation modules. Particularly, investigated the completion of torsion-free reduced modules over discrete valuation rings.
format Dissertations
author EFRINITA IRWAN (30113010), SRI
spellingShingle EFRINITA IRWAN (30113010), SRI
VALUATIONS ON VECTOR SPACES AS A GENERALIZATION OF VALUATIONS ON FIELDS
author_facet EFRINITA IRWAN (30113010), SRI
author_sort EFRINITA IRWAN (30113010), SRI
title VALUATIONS ON VECTOR SPACES AS A GENERALIZATION OF VALUATIONS ON FIELDS
title_short VALUATIONS ON VECTOR SPACES AS A GENERALIZATION OF VALUATIONS ON FIELDS
title_full VALUATIONS ON VECTOR SPACES AS A GENERALIZATION OF VALUATIONS ON FIELDS
title_fullStr VALUATIONS ON VECTOR SPACES AS A GENERALIZATION OF VALUATIONS ON FIELDS
title_full_unstemmed VALUATIONS ON VECTOR SPACES AS A GENERALIZATION OF VALUATIONS ON FIELDS
title_sort valuations on vector spaces as a generalization of valuations on fields
url https://digilib.itb.ac.id/gdl/view/24360
_version_ 1822020373472870400

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