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A generalization of noncommutating graph via automorphisms of a group
Let G be a group. By using a family َA of subsets of automorphisms of G, we introduced a simple graph T_A(G), which is a generalization of the non-commuting graph. In this paper, we study the combinatorial properties of T_A(G).
On the center of automorphism group of a group
Abstract. If the centre of a group G is trivial, then so is the centre of its automorphism group. We study the structure of the centre of the automorphism group of a group G when the centre of G is a cyclic group.
In particular...
Automorphism groups of some generalized Cayley graphs
the
clique number and automorphism group of n
R, where R = Zp^2 or R = Zp^3 ....
SOME RESULTS ON THE POWER GRAPH OF GROUPS
The aim of this paper is to identify complete power graphs of groups and compute their clique number and show that power graphs are perfect. Moreover, automorphism of the power graph of cyclic groups is determined here.
Some results on the power graph of finite groups
We classify planar graphs and complete power graphs of groups and show that the only infinite group
with a complete power graph is the Prüfer group Z_{p^∞}. Clique and chromatic numbers and the automorphism group of
power graphs...