Cubic arc-transitive k-circulants
Abstract
For an integer k≥ 1, a graph is called a k-circulant if its automorphism group contains a cyclic semiregular subgroup with k orbits on the vertices. We show that, if k is even, there exist infinitely many cubic arc-transitive k-circulants. We conjecture that, if k is odd, then a cubic arc-transitive k-circulant has order at most 6k2. Our main result is a proof of this conjecture when k is squarefree and coprime to 6.
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