A few remarks on invariable generation in infinite groups

Abstract

A subset S of a group G invariably generates G if G is generated by \ sg(s) | s∈ S\ for any choice of g(s)∈ G, s∈ S. In case G is topological one defines similarly the notion of topological invariable generation. A topological group G is said to be TIG if it is topologically invariably generated by some subset S⊂eq G. In this paper we study the problem of (topological) invariable generation for linear groups and for automorphism groups of trees. Our main results show that the Lie group SL2(R) and the automorphism group of a regular tree are TIG, and that the groups PSLm(K) ,m≥ 2 are not IG for certain countable fields of infinite transcendence degree over the prime field.