The graph structure of graph groups that are subgroups of Thompson's group V
Abstract
We determine exactly which graph products, also known as Right Angled Artin Groups, embed into Richard Thompson's group V. It was shown by Bleak and Salazar-Diaz that Z2 * Z was an obstruction. We show that this is the only obstruction. This is shown by proving a graph theory result giving an alternate description of simple graphs without an appropriate induced subgraph.
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