On normal subgroupoids

Abstract

In this paper we present some algebraic properties of subgroupoids and normal subgroupoids. We define the normalizer of a wide subgroupoid H and show that, as in the case of groups, the normalizer is the greatest wide subgroupoid of the groupoid G in which H is normal. Furthermore, we give the definition of center and commutator and prove that both are normal subgroupoids, the first one of the union of all the isotropy groups of G and the second one of G. Finally, we introduce the concept of inner isomorphism of G and show that the set of all the inner isomorphisms of G is a normal subgroupoid, which is isomorphic to the quotient groupoid of G by its center Z(G), which extends to groupoids a well-known result in groups.