Orthogonal and oriented Fano planes, triangular embeddings of K7, and geometrical representations of the Frobenius group F21

Abstract

In this paper we present some geometrical representations of the Frobenius group of order 21 (henceforth, F21). The main focus is on investigating the group of common automorphisms of two orthogonal Fano planes and the automorphism group of a suitably oriented Fano plane. We show that both groups are isomorphic to F21, independently of the choice of the two orthogonal Fano planes and of the choice of the orientation. We show, moreover, that any triangular embedding of the complete graph K7 into a surface is isomorphic to the classical toroidal biembedding and hence is face 2-colorable, with the two color classes defining a pair of orthogonal Fano planes. As a consequence, we show that, for any triangular embedding of K7 into a surface, the group of the automorphisms that preserve the color classes is the Frobenius group of order 21. This way we provide three geometrical representations of F21. Also, we apply the representation in terms of two orthogonal Fano planes to give an alternative proof that F21 is the automorphism group of the Kirkman triple system of order 15 that is usually denoted as #61.