String C-groups of 2-power order project onto a common string C-group

Abstract

String C-groups are precisely the automorphism groups of abstract regular polytopes. A certain regular d-polytope Cd with an automorphism group of order 22d-1, discovered by Conder and shown to have the smallest number of flags among all regular d-polytopes of high ranks, also has the important extremal property to be the unique minimal d-polytope, with respect to combinatorial covering, among all finite regular d-polytopes with 2-power automorphism groups. In other words, the automorphism group of Cd is a quotient group of every finite string C-group of rank d and 2-power order; and every finite regular d-polytope with an automorphism groups of 2-power order covers Cd. The existence of a unique minimal element among string C-groups of 2-power order and given rank is remarkable in itself.