ENDOMORPHISM RINGS OF FINITELY GENERATED MODULES OVER A PRINCIPAL IDEAL DOMAIN

ENDOMORPHISM RINGS OF FINITELY GENERATED MODULES OVER A PRINCIPAL IDEAL DOMAIN

This thesis deals with an identication of endomorphism rings of nitely generated modules over a principal ideal domain with matrix rings. A fact that will be used is that a nitely generated module over a principal ideal domain can be decomposed into a direct sum of its torsion submodule and a fre...

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Main Author: Romaldy Stephanus, Johannes
Format: Theses
Language:Indonesia
Online Access:https://digilib.itb.ac.id/gdl/view/44566
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Institution: Institut Teknologi Bandung
Language: Indonesia
id id-itb.:44566
spelling id-itb.:445662019-10-28T14:47:47ZENDOMORPHISM RINGS OF FINITELY GENERATED MODULES OVER A PRINCIPAL IDEAL DOMAIN Romaldy Stephanus, Johannes Indonesia Theses principal ideal domain, module over a principal ideal domain, nitely genera- ted, endomorphism ring. INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/44566 This thesis deals with an identication of endomorphism rings of nitely generated modules over a principal ideal domain with matrix rings. A fact that will be used is that a nitely generated module over a principal ideal domain can be decomposed into a direct sum of its torsion submodule and a free submodule. Furthermore, the torsion submodule can be decomposed into a direct sum of primary submodules and each primary submodules can be decomposed into a direct sum of cyclic submodules. On the other hand, the free submodule can be decomposed into a direct sum of cyclic submodules generated by elements in its basis. In this thesis, it is shown that the endomorphism rings of nitely generated modules over a principal ideal domain can be identied by a 2 2 upper block matrix ring where block-(11) represents the endomorphism ring of torsion submodule, block-(12) represents the homomorphism module from the free submodule to the torsion submodule, and block- (22) represents the endomorphism ring of free submodule. Details of each block is also presented in this thesis. 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 thesis deals with an identication of endomorphism rings of nitely generated modules over a principal ideal domain with matrix rings. A fact that will be used is that a nitely generated module over a principal ideal domain can be decomposed into a direct sum of its torsion submodule and a free submodule. Furthermore, the torsion submodule can be decomposed into a direct sum of primary submodules and each primary submodules can be decomposed into a direct sum of cyclic submodules. On the other hand, the free submodule can be decomposed into a direct sum of cyclic submodules generated by elements in its basis. In this thesis, it is shown that the endomorphism rings of nitely generated modules over a principal ideal domain can be identied by a 2 2 upper block matrix ring where block-(11) represents the endomorphism ring of torsion submodule, block-(12) represents the homomorphism module from the free submodule to the torsion submodule, and block- (22) represents the endomorphism ring of free submodule. Details of each block is also presented in this thesis.
format Theses
author Romaldy Stephanus, Johannes
spellingShingle Romaldy Stephanus, Johannes
ENDOMORPHISM RINGS OF FINITELY GENERATED MODULES OVER A PRINCIPAL IDEAL DOMAIN
author_facet Romaldy Stephanus, Johannes
author_sort Romaldy Stephanus, Johannes
title ENDOMORPHISM RINGS OF FINITELY GENERATED MODULES OVER A PRINCIPAL IDEAL DOMAIN
title_short ENDOMORPHISM RINGS OF FINITELY GENERATED MODULES OVER A PRINCIPAL IDEAL DOMAIN
title_full ENDOMORPHISM RINGS OF FINITELY GENERATED MODULES OVER A PRINCIPAL IDEAL DOMAIN
title_fullStr ENDOMORPHISM RINGS OF FINITELY GENERATED MODULES OVER A PRINCIPAL IDEAL DOMAIN
title_full_unstemmed ENDOMORPHISM RINGS OF FINITELY GENERATED MODULES OVER A PRINCIPAL IDEAL DOMAIN
title_sort endomorphism rings of finitely generated modules over a principal ideal domain
url https://digilib.itb.ac.id/gdl/view/44566
_version_ 1821999180136054784

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