Actions, semidirect products and crossed semimodules in the category of small categories with a fixed set of objects

Abstract

We generalize to the fibres of the fibration OCat→Set, defined by mapping a small category X to its set of objects X0=ob(X), the classical notions of action and semidirect product of monoids. We prove that the equivalence between monoid actions of a monoid Y and Schreier split extensions on Y, which is well known to generalize the equivalence between actions and split extensions for groups, is an instance of a broader adjunction between Schreier points and actions in the fibres O-1(B). This adjunction is an equivalence if and only if B=1, i.e., for the category Mon of monoids. Similarly, we prove that there is an adjunction (which, in the case of monoids, results in a known equivalence due to Patchkoria) between Schreier internal categories in the fibres O-1(B) and the category of crossed semimodules in O-1(B). The latter are defined by translating in O-1(B) the notion of crossed semimodule in Mon. Eventually, we prove that, by defining crossed modules appropriately, this last adjunction yields an equivalence between crossed modules and Schreier internal groupoids in the fibres of O.