Normality Of Quartic Cayley Graphs On Regular p-Groups: A CFSG-Free Approach
Abstract
Relying on the Classification of Finite Simple Groups it was shown by Feng and Xu (Discrete Math., 2005) that every quartic Cayley graph of a regular p-group, p ≠ 2,5, is normal. In this paper a CFSG-free proof of Feng-Xu theorem is given. Along the way it is also proved that for an arbitrary p-group G with a minimum set \a,b\ of two generators, in the corresponding Cayley graph Cay(G,\a,a-1,b,b-1\) the induced action of vertex stabilizer on the neighbors' set is contained in the dihedral group D8.
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