Coarse group theoretic study on stable mixed commutator length

Abstract

Let G be a group and N a normal subgroup of G. We study the large scale behavior, not the exact values themselves, of the stable mixed commutator length sclG,N on the mixed commutator subgroup [G,N]; when N=G, sclG,N equals the stable commutator length sclG on the commutator subgroup [G,G]. For this purpose, we regard sclG,N not only as a function from [G,N] to R≥ 0, but as a bi-invariant metric function d+sclG,N from [G,N]× [G,N] to R≥ 0. Our main focus is coarse group theoretic structures of ([G,N],d+sclG,N). Our preliminary result (the absolute version) connects, via the Bavard duality, ([G,N],d+sclG,N) and the quotient vector space of the space of G-invariant quasimorphisms on N over one of such homomorphisms. In particular, we prove that the dimension of this vector space equals the asymptotic dimension of ([G,N],d+sclG,N). Our main result is the comparative version: we connect the coarse kernel, formulated by Leitner and Vigolo, of the coarse homomorphism G,N ([G,N],d+sclG,N) ([G,N],d+sclG); y y, and a certain quotient vector space W(G,N) of the space of invariant quasimorphisms. Assume that N=[G,G] and that W(G,N) is finite dimensional with dimension . Then we prove that the coarse kernel of G,N is isomorphic to Z as a coarse group. In contrast to the absolute version, the space W(G,N) is finite dimensional in many cases, including all (G,N) with finitely generated G and nilpotent G/N. As an application of our result, given a group homomorphism G H between finitely generated groups, we define an R-linear map `inside' the groups, which is dual to the naturally defined R-linear map from W(H,[H,H]) to W(G,[G,G]) induced by .