Representing alternating groups as self-dual string C-groups of high rank

Abstract

The highest rank of a string C-group representation of the alternating group An is known for each n, but no self-dual representations attaining this highest rank are known when n > 12. Motivated by computational results for alternating groups of small degree, we examine a vertex-gluing construction for permutation representation graphs. We establish conditions under which gluing two string C-groups produces another string C-group, and use this construction to obtain infinite families of self-dual representations of alternating groups. In particular, for every n = 4m+3 ≥ 15, we construct n+98 distinct self-dual string C-groups of rank 2m isomorphic to An. These representations have rank one below the maximum possible rank of string C-group representations for An, and to the authors' knowledge are the highest-rank self-dual representations currently known for alternating groups.