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For a Graph G, I am trying to understand how the automorphism of G is equivalent to the automorphism of the complement of G.

I understand that an automorphism is an isomorphism of G onto itself. This, in fact, seems like it should be a fairly basic concept and so my confusion is likely in relation to what abstract concept an automorphism actually manifests as, and therefore how the equivalency can be seen.

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    $\begingroup$ What is the complement of a group? Do you mean the opposite group? $\endgroup$
    – Thorgott
    Mar 31 '20 at 22:49
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    $\begingroup$ @Thorgott I think $G$ is a graph. $\endgroup$
    – Arthur
    Mar 31 '20 at 22:57
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Because $$(f(i),f(j))\in E(G) \iff (i,j)\in E(G)$$ is equivalent to $$(f(i),f(j))\not\in E(G) \iff (i,j)\not\in E(G),$$ which is equivalent to $$(f(i),f(j))\in E(\overline{G}) \iff (i,j)\in E(\overline{G}).$$

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  • $\begingroup$ Thank you, that is very helpful! I am still having trouble imagining a visual example of this using graphs, if you have any good ideas where I could look for such? $\endgroup$
    – JFreeman
    Mar 31 '20 at 23:15
  • $\begingroup$ Another helpful thought for me is that automorphisms preserve adjacencies and hence non-adjacencies. That's an easy way to think about this concept. $\endgroup$
    – JFreeman
    Apr 20 '20 at 9:21

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