The Notions of Center, Commutator and Inner Isomorphism for Groupoids
In this paper we introduce some algebraic properties of subgroupoids and normal subgroupoids. we define other things, we define the normalizer of a wide subgroupoid H of a groupoid G and show that, as in the case of groups, this normalizer is the greatest wide subgroupoid of G in which H is normal....
- Autores:
-
Ávila, Jesús
Marín, Víctor
- Tipo de recurso:
- Fecha de publicación:
- 2020
- Institución:
- Universidad EAFIT
- Repositorio:
- Repositorio EAFIT
- Idioma:
- eng
- OAI Identifier:
- oai:repository.eafit.edu.co:10784/17661
- Acceso en línea:
- http://hdl.handle.net/10784/17661
- Palabra clave:
- Groupoid
Normal subgroupoid
Normalizer
Center
Commutator
Inner isomorphisms
Grupoide
Subgrupoide normal
Normalizador
Centro
Conmutador
Isomorfismo interno
- Rights
- License
- Copyright © 2020 Jesús Ávila, Víctor Marín
Summary: | In this paper we introduce some algebraic properties of subgroupoids and normal subgroupoids. we define other things, we define the normalizer of a wide subgroupoid H of a groupoid G and show that, as in the case of groups, this normalizer is the greatest wide subgroupoid of G in which H is normal. Furthermore, we provide definitions of the center Z(G) and the commutator G' of the groupoid G and prove that both of them are normal subgroupoids. We give the notions of inner and partial isomorphism of G and show that the groupoid I(G) given by the set of all the inner isomorphisms of G is a normal subgroupoid of A(G), the set of all the partial isomorphisms of G. Moreover, we prove that I(G) is isomorphic to the quotient groupoid G/Z(G), which extends to groupoids the corresponding well-known result for groups. |
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