Symmetric automorphisms of free groups, BNSR-invariants, and finiteness properties

Abstract

The BNSR-invariants of a group G are a sequence 1(G)⊃eq 2(G) ⊃eq ·s of geometric invariants that reveal important information about finiteness properties of certain subgroups of G. We consider the symmetric automorphism group Autn and pure symmetric automorphism group P Autn of the free group Fn, and inspect their BNSR-invariants. We prove that for n 2, all the ``positive'' and ``negative'' character classes of P Autn lie in n-2(P Autn) n-1(P Autn). We use this to prove that for n 2, n-2( Autn) equals the full character sphere S0 of Autn but n-1( Autn) is empty, so in particular the commutator subgroup Autn' is of type Fn-2 but not Fn-1. Our techniques involve applying Morse theory to the complex of symmetric marked cactus graphs.