Non-commuting graphs of nilpotent groups
Abstract
Let G be a non-abelian group and Z(G) be the center of G. The non-commuting graph G associated to G is the graph whose vertex set is G Z(G) and two distinct elements x,y are adjacent if and only if xy≠ yx. We prove that if G and H are non-abelian nilpotent groups with irregular isomorphic non-commuting graphs, then |G|=|H|.
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