Total rings of fractions and Hermite rings

Total rings of fractions and Hermite rings

In this paper, we show general properties of total rings of fractions and of Hermite rings. We study the relationships between those rings and the finite dimensional K−algebras. A finite dimensional K−algebra is a commutative algebra with unit such that this is finite dimensional as vector space...

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Detalles Bibliográficos
Main Authors: Granados Pinzón, Claudia, Olaya León, Wilson
Formato: Online
Idioma:spa
Publicado: Universidad Pedagógica y Tecnológica de Colombia 2020
Subjects:
Localización, producto directo de anillos, anillo de Hermite y $K-$álgebra finita.
Localization, direct product of rings, Hermite ring and finite dimensional $K-$algebra
Acceso en liña:https://revistas.uptc.edu.co/index.php/ciencia_en_desarrollo/article/view/10223
Descripción
Summary:In this paper, we show general properties of total rings of fractions and of Hermite rings. We study the relationships between those rings and the finite dimensional K−algebras. A finite dimensional K−algebra is a commutative algebra with unit such that this is finite dimensional as vector space over a field K. We proof that the finite dimensional K−algebras are total rings of fractions and also Hermite rings. In addition, we show that direct product of fields is another example of total ring of fractions and Hermite ring.