Strongly regular graphs from integral point sets in even dimensional affine spaces over finite fields
Abstract
In the m-dimensional affine space AG(m,q) over the finite field Fq of odd order q, the analogous of the Euclidean distance gives rise to a graph Gm,q where vertices are the points of AG(m,q) and two vertices are adjacent if their (formal) squared Euclidean distance is a square in Fq (including the zero). In 2009, Kurz and Meyer made the conjecture that if m is even then Gm,q is a strongly regular graph. In this paper we prove their conjecture.
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