a kind of non-commuting graph of finite groups

Authors

b. tolue

a. erfanian

a. jafarzadeh

abstract

let g be a fixed element of a finite group g. we introduce the g-noncommuting graph of g whose vertex set is whole elements of the group g and two vertices x,y are adjacent whenever [x,y] g  and  [y,x] g. we denote this graph by . in this paper, we present some graph theoretical properties of g-noncommuting graph. specially, we investigate about its planarity and regularity, its clique number and dominating number. we prove that if g, h are isoclinic groups with |z (g)|=|z (h)|, then their associated graphs are isomorphic.

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Journal title:
journal of sciences, islamic republic of iran

Publisher: university of tehran

ISSN 1016-1104

volume 25

issue 4 2014

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