Invariable generation of Thompson groups
Abstract
A subset S of a group G invariably generates G if G= sg(s) | s ∈ S for every choice of g(s) ∈ G,s ∈ S. We say that a group G is invariably generated if such S exists, or equivalently if S=G invariably generates G. In this paper, we study invariable generation of Thompson groups. We show that Thompson group F is invariable generated by a finite set, whereas Thompson groups T and V are not invariable generated.
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