Realisability problem in arrow categories

Abstract

In this paper we raise the realisability problem in arrow categories. Namely, for a fixed category C and for arbitrary groups H G1× G2, is there an object φ A1 → A2 in Arr(C) such that AutArr(C)(φ) = H, AutC(A1) = G1 and AutC(A2) = G2? We are interested in solving this problem when C =HoTop*, the homotopy category of pointed topological spaces. To that purpose, we first settle that question in the positive when C = Graphs. Then, we construct an almost fully faithful functor from Graphs to CDGA, the category of commutative differential graded algebras, that provides among other things, a positive answer to our question when C = CDGA and, as long as we work with finite groups, when C =HoTop*. Some results on representability of concrete categories are also obtained.