Enumeration of Cayley graphs over a nonabelian group of order 8p
Abstract
Let T8p = a,b a2p=b8=e,ap=b4,b-1ab=a-1 be a nonabelian group of order 8p, where p is an odd prime number. In this paper, we give the formula to calculate the number of Cayley graphs over T8p up to isomorphism by using the P\'olya Enumeration Theorem. Moreover, we get the formula to calculate the number of connected Cayley graphs over T8p by deleting the disconnected graphs. By applying the results, we list the exact number of (connected) Cayley graphs for 3≤ p ≤ 13.
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