Weak action representability of 2-nilpotent groups

Abstract

In this article, we investigate the representability of actions of the category Nil2(Grp) of 2-nilpotent groups. We first provide an algebraic characterisation of derived actions in Nil2(Grp) by determining a universal strict general actor of an object X, which turns out to be the group Autc(X) of central automorphisms of X. We also characterise the morphisms B Autc(X) that define an action of B on X in Nil2(Grp). We then show that Nil2(Grp) is not action representable, and that the existence of a weak representation is related to the amalgamation property. Using the construction of an amalgam of a suitable family of abelian subgroups of Autc(X), we prove that the category Nil2(Grp) is weakly action representable, and that a weak representing object can be chosen to be an abelian group. Finally, we show that Nil2(Grp) is not locally algebraically cartesian closed.