Recognizing and testing isomorphism of Cayley graphs over an abelian group of order 4p in polynomial time
Abstract
We construct a polynomial-time algorithm that given a graph X with 4p vertices (p is prime), finds (if any) a Cayley representation of X over the group C2× C2× Cp. This result, together with the known similar result for circulant graphs, shows that recognising and testing isomorphism of Cayley graphs over an abelian group of order 4p can be done in polynomial time.
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