On the Bieri-Neumann-Strebel-Renz -invariants of the Bestvina-Brady groups

Abstract

We study the Bieri-Neumann-Strebel-Renz invariants and we prove the following criterion: for groups H and K of type FPn such that [H,H] ⊂eq K ⊂eq H and a character : K R with ([H,H]) = 0 we have [] ∈ n(K, Z) if and only if [μ] ∈ n(H, Z) for every character μ : H R that extends . The same holds for the homotopical invariants n(-) when K and H are groups of type Fn. We use these criteria to complete the description of the -invariants of the Bieri-Stallings groups Gm and more generally to describe the -invariants of the Bestvina-Brady groups. We also show that the "only if" direction of such criterion holds if we assume only that K is a subnormal subgroup of H, where both groups are of type FPn. We apply this last result to wreath products.