A new series of dense graphs of high girth

Abstract

Let k 1 be an odd integer, t= k+2 4, and q be a prime power. We construct a bipartite, q-regular, edge-transitive graph C\!D(k,q) of order v 2qk-t+1 and girth g k+5. If e is the the number of edges of C\!D(k,q), then e =(v1+ 1 k-t+1). These graphs provide the best known asymptotic lower bound for the greatest number of edges in graphs of order v and girth at least g, g 5, g = 11,12. For g 24, this represents a slight improvement on bounds established by Margulis and Lubotzky, Phillips, Sarnak; for 5 g 23, g= 11,12, it improves on or ties existing bounds.

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