Edward Dobson, Pablo Spiga, Gabriel Verret
Published 2013-06-17, updated 2014-05-08Version 2
Let $A$ be an abelian group and let $\iota$ be the automorphism of $A$ defined by $i:a\mapsto a^{-1}$. A Cayley graph $\Gamma=\mathrm{Cay}(A,S)$ is said to have an automorphism group \emph{as small as possible} if $\mathrm{Aut}(\Gamma)= A\rtimes\langle i\rangle$. In this paper, we show that almost all Cayley graphs on abelian groups have automorphism group as small as possible, proving a conjecture of Babai and Godsil.
Abelian groups with 3-chromatic Cayley graphs
Cayley graphs of diameter two from difference sets
On the existence and the enumeration of bipartite regular representations of Cayley graphs over abelian groups
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