International Journal of Mathematics and Mathematical Sciences
Volume 27 (2001), Issue 2, Pages 111-123
doi:10.1155/S0161171201002071
The number of edges on generalizations of Paley graphs
Lawrence Sze
Department of Mathematics, California Polytechnic University, San Luis Obispo 93407, CA, USA
Abstract
Evans, Pulham, and Sheenan computed the number of complete 4-subgraphs of Paley graphs by counting the number of edges of the subgraph containing only those nodes x for which x and x−1 are quadratic residues. Here we obtain formulae for the number of edges of generalizations of these subgraphs using Gaussian hypergeometric series and elliptic curves. Such formulae are simple in several infinite families, including those studied by Evans, Pulham, and Sheenan.