Adjacency Matrices of Configuration Graphs

Abstract

In 1960, Hoffman and Singleton HS60 solved a celebrated equation for square matrices of order n, which can be written as ( - 1) In + Jn - A A T = A where In, Jn, and A are the identity matrix, the all one matrix, and a (0,1)--matrix with all row and column sums equal to , respectively. If A is an incidence matrix of some configuration C of type n, then the left-hand side (A):= ( - 1)In + Jn - A A T is an adjacency matrix of the non--collinearity graph of C. In certain situations, (A) is also an incidence matrix of some n configuration, namely the neighbourhood geometry of introduced by Lef\`evre-Percsy, Percsy, and Leemans LPPL. The matrix operator can be reiterated and we pose the problem of solving the generalised Hoffman--Singleton equation m(A)=A. In particular, we classify all (0,1)--matrices M with all row and column sums equal to , for = 3,4, which are solutions of this equation. As a by--product, we obtain characterisations for incidence matrices of the configuration 103F in Kantor's list Kantor and the 174 configuration #1971 in Betten and Betten's list BB99.