On the stabilizers of finite sets of numbers in the R. Thompson group F

Abstract

We study subgroups HU of the R. Thompson group F which are stabilizers of finite sets U of numbers in the interval (0,1). We describe the algebraic structure of HU and prove that the stabilizer HU is finitely generated if and only if U consists of rational numbers. We also show that such subgroups are isomorphic surprisingly often. In particular, we prove that if finite sets U⊂ [0,1] and V⊂ [0,1] consist of rational numbers which are not finite binary fractions, and |U|=|V|, then the stabilizers of U and V are isomorphic. In fact these subgroups are conjugate inside a subgroup F<([0,1]) which is the completion of F with respect to what we call the Hamming metric on F. Moreover the conjugator can be found in a certain subgroup < F which consists of possibly infinite tree-diagrams with finitely many infinite branches. We also show that the group is non-amenable.