The BNSR-invariants of the Stein group F2,3

Abstract

The Stein group F2,3 is the group of orientation-preserving homeomorphisms of the unit interval with slopes of the form 2p3q (p,q∈Z) and breakpoints in Z[16]. This is a natural relative of Thompson's group F. In this paper we compute the Bieri-Neumann-Strebel-Renz (BNSR) invariants m(F2,3) of the Stein group for all m∈N. A consequence of our computation is that (as with F) every finitely presented normal subgroup of F2,3 is of type F∞. Another, more surprising, consequence is that (unlike F) the kernel of any map F2,3 is of type F∞, even though there exist maps F2,3 Z2 whose kernels are not even finitely generated. In terms of BNSR-invariants, this means that every discrete character lies in ∞(F2,3), but there exist (non-discrete) characters that do not even lie in 1(F2,3). To the best of our knowledge, F2,3 is the first group whose BNSR-invariants are known exhibiting these properties.