Stable W-length

Abstract

We study stable W-length in groups, especially for W equal to the n-fold commutator gamman:=[x1,[x2, . . . [xn-1,xn]] . . . ]. We prove that in any perfect group, for any n at least 2 and any element g, the stable commutator length of g is at least as big as 22-n times the stable gamman-length of g. We also establish analogues of Bavard duality for words gamman and for beta2:=[[x,y],[z,w]]. Our proofs make use of geometric properties of the asymptotic cones of verbal subgroups with respect to bi-invariant metrics. In particular, we show that for suitable W, these asymptotic cones contain certain subgroups that are normed vector spaces.