The binary q-analogue of the Fano plane has a trivial automorphism group

Abstract

A q-analogue of a t-design is a set S of subspaces (of dimension k) of a finite vector space V over a field of order q such that each t subspace is contained in a constant λ number of elements of S. The smallest nontrivial feasible parameters occur when V has dimension 7, t=2, q=2, and k=3; which is the q-analogue of a 2-(7,3,1) design, the Fano plane. The existence of the binary q-analogue of the Fano plane has yet to be resolved, and it was shown by Kiermaier et al. (2016) that such a configuration must have an automorphism group of order at most 2. We show that the binary q-analogue of the Fano plane has a trivial automorphism group.