A construction of 3-e.c. graphs using quadrances
Abstract
A graph is n-e.c. (n-existentially closed) if for every pair of subsets A, B of vertex set V of the graph such that A B = and |A| + |B| = n, there is a vertex z not in A B joined to each vertex of A and no vertex of B. Few explicit families of n-e.c. are known for n > 2. In this short note, we give a new construction of 3-e.c. graphs using the notion of quadrance in the finite Euclidean space Zpd.
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