Symmetric (15,8,4)-designs in terms of the geometry of binary simplex codes of dimension 4

Abstract

Let n=2k-1 and m=2k-2 for a certain k 3. Consider the point-line geometry of 2m-element subsets of an n-element set. Maximal singular subspaces of this geometry correspond to binary simplex codes of dimension k. For k 4 the associated collinearity graph contains maximal cliques different from maximal singular subspaces. We investigate maximal cliques corresponding to symmetric (n,2m,m)-designs. The main results concern the case k=4 and give a geometric interpretation of the five well-known symmetric (15,8,4)-designs.