The BNS invariants of the braid groups and pure braid groups of some surfaces

Abstract

We compute and explicitly describe the Bieri-Neumann-Strebel invariants 1 for the full and pure braid groups of the sphere S2, the real projective plane RP2 and specially the torus T and the Klein bottle K. In order to do this for M= T or M= K, and n ≥ 2, we use the nth-configuration space of M to show that the action by homeomorphisms of the group Out(Pn(M)) on the character sphere S(Pn(M)) contains certain permutation of coordinates, under which 1(Pn( T))c and 1(Pn( K))c are invariant. Furthermore, 1(Pn( T))c and 1(Pn(S2))c (the latter with n ≥ 5) are finite unions of pairwise disjoint circles, and 1(Pn( K))c is finite. This last fact implies that there is a normal finite index subgroup H ≤ Aut(Pn( K)) such that the Reidemeister number R() is infinite for every ∈ H.