Property FA for random -gonal groups
Abstract
In the binomial -gonal model for random groups, where the random relations all have fixed length ≥ 3 and the number of generators goes to infinity, we establish a double threshold near density d=1 where the group goes from being free to having Serre's property FA. As a consequence, random -gonal groups at densities 1 < d< 12 have boundaries homeomorphic to the Menger sponge, and 1 is also the threshold for finiteness of Out(G). We also see that the thresholds for property FA and Kazhdan's property (T) differ when ≥ 4. Our methods are inspired by work of Antoniuk-Luczak-\'Swiatkowski and Dahmani-Guirardel-Przytycki.
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