A commutative Bezout PM* domain is an elementary divisor ring

A commutative Bezout PM* domain is an elementary divisor ring

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Бібліографічні деталі
Дата:2015
Автори: B. Zabavsky, A. Gatalevych
Формат: Стаття
Мова:English
Опубліковано: 2015
Назва видання:Algebra and discrete mathematics
Онлайн доступ:http://jnas.nbuv.gov.ua/article/UJRN-0000739315
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Назва журналу:Library portal of National Academy of Sciences of Ukraine | LibNAS

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Library portal of National Academy of Sciences of Ukraine | LibNAS
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record_format dspace
spelling open-sciencenbuvgovua-659092024-04-16T13:21:08Z A commutative Bezout PM* domain is an elementary divisor ring B. Zabavsky A. Gatalevych 1726-3255 2015 en Algebra and discrete mathematics http://jnas.nbuv.gov.ua/article/UJRN-0000739315 Article
institution Library portal of National Academy of Sciences of Ukraine | LibNAS
collection Open-Science
language English
series Algebra and discrete mathematics
spellingShingle Algebra and discrete mathematics
B. Zabavsky
A. Gatalevych
A commutative Bezout PM* domain is an elementary divisor ring
format Article
author B. Zabavsky
A. Gatalevych
author_facet B. Zabavsky
A. Gatalevych
author_sort B. Zabavsky
title A commutative Bezout PM* domain is an elementary divisor ring
title_short A commutative Bezout PM* domain is an elementary divisor ring
title_full A commutative Bezout PM* domain is an elementary divisor ring
title_fullStr A commutative Bezout PM* domain is an elementary divisor ring
title_full_unstemmed A commutative Bezout PM* domain is an elementary divisor ring
title_sort commutative bezout pm* domain is an elementary divisor ring
publishDate 2015
url http://jnas.nbuv.gov.ua/article/UJRN-0000739315
work_keys_str_mv AT bzabavsky acommutativebezoutpmdomainisanelementarydivisorring
AT agatalevych acommutativebezoutpmdomainisanelementarydivisorring
AT bzabavsky commutativebezoutpmdomainisanelementarydivisorring
AT agatalevych commutativebezoutpmdomainisanelementarydivisorring
first_indexed 2025-07-22T05:10:08Z
last_indexed 2025-07-22T05:10:08Z
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