Asymptotic enumeration of vertex-transitive graphs of fixed valency
Abstract
Let G be a group and let S be an inverse-closed and identity-free generating set of G. The Cayley graph (G,S) has vertex-set G and two vertices u and v are adjacent if and only if uv-1∈ S. Let CAYd(n) be the number of isomorphism classes of d-valent Cayley graphs of order at most n. We show that (CAYd(n))∈ (d( n)2), as n∞. We also obtain some stronger results in the case d=3.
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