The F2-Rank and Size of Graphs

Abstract

We consider the extremal family of graphs of order 2n in which no two vertices have identical neighbourhoods, yet the adjacency matrix has rank only n over the field of two elements. A previous result from algebraic geometry shows that such graphs exist for all even n and do not exist for odd n. In this paper we provide a new combinatorial proof for this result, offering greater insight to the structure of graphs with these properties. We introduce a new graph product closely related to the Kronecker product, followed by a construction for such graphs for any even n. Moreover, we show that this is an infinite family of strongly-regular quasi-random graphs whose signed adjacency matrices are symmetric Hadamard matrices. Conversely, we provide a combinatorial proof that for all odd n, no twin-free graphs of minimal F2-rank exist, and that the next best-possible rank (n+1) is attainable, which is tight.