On orders of automorphisms of vertex-transitive graphs
Abstract
In this paper we investigate orders, longest cycles and the number of cycles of automorphisms of finite vertex-transitive graphs. In particular, we show that the order of every automorphism of a connected vertex-transitive graph with n vertices and of valence d, d 4, is at most cd n where c3=1 and c4 = 9. Whether such a constant cd exists for valencies larger than 4 remains an unanswered question. Further, we prove that every automorphism g of a finite connected 3-valent vertex-transitive graph , K3,3, has a regular orbit, that is, an orbit of g of length equal to the order of g. Moreover, we prove that in this case either belongs to a well understood family of exceptional graphs or at least 5/12 of the vertices of belong to a regular orbit of g. Finally, we give an upper bound on the number of orbits of a cyclic group of automorphisms C of a connected 3-valent vertex-transitive graph in terms of the number of vertices of and the length of a longest orbit of C.
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