Circle graphs and the automorphism group of the circle
Abstract
We prove that Aut( S1) coincides with the automorphism group of the circle graph C, i.e. the intersection graph of the family of chords of S1. We prove that the countable subgraph of C induced by the rational chords is a strongly universal element of the family of circle graphs, and that it is invariant under local complementation. The only other known connected graphs that have the latter property are K2 and the Rado graph.
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