A Zero-One Law for Random Subgroups of some Totally Disconnected Groups

Abstract

Let A be a locally compact group topologically generated by d elements and let k>d. Consider the action, by pre-composition, of Aut(Fk) on the set of marked, k-generated, dense subgroups Dk,A := h:Fk --> A | h(Fk) is dense in A. We prove the ergodicity of this action for two families of simple, totally disconnected locally compact groups. (i) A = PSL(2,K) where K is a non-Archimedean local field (of characteristic not equal to 2), (ii) A = Aut0(T) - the group of orientation preserving automorphisms of a (q+1)-regular tree, for q > 1. In contrast, a recent result of Minsky's shows that the same action is not ergodic when A = PSL(2,R) or A = PSL(2,C). Therefore if K is a local field (with characteristic different than 2) the action of Aut(Fk) on Dk,PSL(2,K) is ergodic, for every k>2, if and only if K is non-Archimedean. Ergodicity implies that every "measurable property" either holds or fails to hold for almost every k-generated dense subgroup of A.