Abstract
Let H be a subgroup of a finite non-abelian group G and g∈G. Let Z(H,G)={x∈H:xy=yx,∀y∈G}. We introduce the graph ΔH,Gg whose vertex set is G\Z(H,G) and two distinct vertices x and y are adjacent if x∈H or y∈H and [x,y]≠g,g−1, where [x,y]=x−1y−1xy. In this paper, we determine whether ΔH,Gg is a tree among other results. We also discuss about its diameter and connectivity with special attention to the dihedral groups.
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference22 articles.
1. Non-commuting graph of a group
2. Planar, Toroidal, and Projective Commuting and Noncommuting Graphs
3. On the relation between the non-commuting graph and the prime graph;Ahanjideh;Int. J. Group Theory,2012
4. Groups with the same non-commuting graph
5. Some results on non-commuting graph of a finite group;Darafsheh;Ital. J. Pure Appl. Math.,2010
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