Finiteness of outer automorphism groups of random right-angled Artin groups

Abstract

We consider the outer automorphism group Out(AGamma) of the right-angled Artin group AGamma of a random graph Gamma on n vertices in the Erdos--Renyi model. We show that the functions (log(n)+log(log(n)))/n and 1-(log(n)+log(log(n)))/n bound the range of edge probability functions for which Out(AGamma) is finite: if the probability of an edge in Gamma is strictly between these functions as n grows, then asymptotically Out(AGamma) is almost surely finite, and if the edge probability is strictly outside of both of these functions, then asymptotically Out(AGamma) is almost surely infinite. This sharpens results of Ruth Charney and Michael Farber from their preprint "Random groups arising as graph products", arXiv:1006.3378v1.