English

Internal object actions in homological categories

Category Theory 2010-03-02 v1 Group Theory

Abstract

Let GG and AA be objects of a finitely cocomplete homological category C\mathbb C. We define a notion of an (internal) action of GG of AA which is functorially equivalent with a point in C\mathbb C over GG, i.e. a split extension in C\mathbb C with kernel AA and cokernel GG. This notion and its study are based on a preliminary investigation of cross-effects of functors in a general categorical context. These also allow us to define higher categorical commutators. We show that any proper subobject of an object EE (i.e., a kernel of some map on EE in C\mathbb C) admits a "conjugation" action of EE, generalizing the conjugation action of EE on itself defined by Bourn and Janelidze. If C\mathbb C is semi-abelian, we show that for subobjects XX, YY of some object AA, XX is proper in the supremum of XX and YY if and only if XX is stable under the restriction to YY of the conjugation action of AA on itself. This amounts to an elementary proof of Bourn and Janelidze's functorial equivalence between points over GG in C\mathbb C and algebras over a certain monad TG\mathbb T_G on C\mathbb C. The two axioms of such an algebra can be replaced by three others, in terms of cross-effects, two of which generalize the usual properties of an action of one group on another.

Keywords

Cite

@article{arxiv.1003.0096,
  title  = {Internal object actions in homological categories},
  author = {Manfred Hartl and Bruno Loiseau},
  journal= {arXiv preprint arXiv:1003.0096},
  year   = {2010}
}

Comments

29 pages

R2 v1 2026-06-21T14:51:55.940Z