English

Split Lemma and First Isomorphism Theorem for groupoids

Group Theory 2026-01-12 v2 Category Theory

Abstract

Groupoids are the oidification of groups, and they are largely used in topology and representation theory. We consider here the category Gpd\mathsf{Gpd} of all groupoids with all morphisms, and the category GpdΛ\mathsf{Gpd}_\Lambda of groupoids over a fixed set of vertices Λ\Lambda, with morphisms fixing Λ\Lambda. In GpdΛ\mathsf{Gpd}_\Lambda, a First Isomorphism Theorem is already well known; see \'Avila, Mar\'in, and Pinedo (2020). Famously, the First Isomorphism Theorem fails to hold in Gpd\mathsf{Gpd}. However, we retrieve here a universally lifted version of the First Isomorphism Theorem in Gpd\mathsf{Gpd}, through the definition of virtual kernels. Semidirect products of a group by a groupoid are well known. We define crossed products in Gpd\mathsf{Gpd}, and prove that they are equivalent to split epimorphisms, i.e. that they are the `categorial' notion of semidirect product in Gpd\mathsf{Gpd} in the sense of Bourn and Janelidze (1998). We observe that in GpdΛ\mathsf{Gpd}_\Lambda crossed products and semidirect products are essentially equivalent, under mild assumptions, and our Split Lemma in Gpd\mathsf{Gpd} collapses to a much simpler Split Lemma in GpdΛ\mathsf{Gpd}_\Lambda that appears in Metere and Montoli (2010) and Ibort and Marmo (2023).

Keywords

Cite

@article{arxiv.2509.13973,
  title  = {Split Lemma and First Isomorphism Theorem for groupoids},
  author = {Davide Ferri},
  journal= {arXiv preprint arXiv:2509.13973},
  year   = {2026}
}

Comments

40 pages, 11 figures. Comments (including suggested references) are welcome

R2 v1 2026-07-01T05:41:54.320Z