English

Bavard's duality theorem for mixed commutator length

Group Theory 2022-03-23 v4 Algebraic Topology Geometric Topology

Abstract

Let NN be a normal subgroup of a group GG. A quasimorphism ff on NN is GG-invariant if f(gxg1)=f(x)f(gxg^{-1}) = f(x) for every gGg \in G and every xNx \in N. The goal in this paper is to establish Bavard's duality theorem of GG-invariant quasimorphisms, which was previously proved by Kawasaki and Kimura in the case N=[G,N]N = [G,N]. Our duality theorem provides a connection between GG-invariant quasimorphisms and (G,N)(G,N)-commutator lengths. Here for x[G,N]x \in [G,N], the (G,N)(G,N)-commutator length clG,N(x)\mathrm{cl}_{G,N}(x) of xx is the minimum number nn such that xx is a product of nn commutators which are written as [g,x][g,x] with gGg \in G and hNh \in N. In the proof, we give a geometric interpretation of (G,N)(G,N)-commutator lengths. As an application of our Bavard duality, we obtain a sufficient condition on a pair (G,N)(G,N) under which sclG\mathrm{scl}_G and sclG,N\mathrm{scl}_{G,N} are bi-Lipschitzly equivalent on [G,N][G,N].

Cite

@article{arxiv.2007.02257,
  title  = {Bavard's duality theorem for mixed commutator length},
  author = {Morimichi Kawasaki and Mitsuaki Kimura and Takahiro Matsushita and Masato Mimura},
  journal= {arXiv preprint arXiv:2007.02257},
  year   = {2022}
}

Comments

Final version. Several typos were corrected. In particular, the definition of (G,N)-simplicial surfaces has been fixed. 36 pages, 5 figures, to appear in L'Enseignement Mathematique

R2 v1 2026-06-23T16:51:35.646Z