On super-rigidity of Gromov's random monster group

Abstract

In this article, we show super-rigidity of Gromov's random monster group. We prove that any morphism φα from Gromov's random monster group α to the group G has finite image for almost all α, where G is any of the following types of groups: mapping class group MCG(Sg,b), braid group Bn, outer automorphism group of a free group Out(FN), automorphism group of a free group Aut(FN), hierarchically hyperbolic group, a-Lp-menable group or K-amenable group. We introduce another property called hereditary super-rigidity and prove that α has hereditary super-rigidity with respect to an a-Lp-menable group or a K-amenable group. We also establish a stability theorem for the groups with respect to which α has super-rigidity and hereditary super-rigidity.