English

Binary Subgroups of Direct Products

Group Theory 2022-09-01 v2

Abstract

We explore an elementary construction that produces finitely presented groups with diverse homological finiteness properties -- the {\em binary subgroups}, B(Σ,μ)<G1××GmB(\Sigma,\mu)<G_1\times\dots\times G_m. These full subdirect products require strikingly few generators. If each GiG_i is finitely presented, B(Σ,μ)B(\Sigma,\mu) is finitely presented. When the GiG_i are non-abelian limit groups (e.g. free or surface groups), the B(Σ,μ)B(\Sigma,\mu) provide new examples of finitely presented, residually-free groups that do not have finite classifying spaces and are not of Stallings-Bieri type. These examples settle a question of Minasyan relating different notions of rank for residually-free groups. Using binary subgroups, we prove that if G1,,GmG_1,\dots,G_m are perfect groups, each requiring at most rr generators, then G1××GmG_1\times\dots\times G_m requires at most rlog2m+1r \lfloor \log_2 m+1 \rfloor generators.

Keywords

Cite

@article{arxiv.2202.02123,
  title  = {Binary Subgroups of Direct Products},
  author = {Martin R. Bridson},
  journal= {arXiv preprint arXiv:2202.02123},
  year   = {2022}
}

Comments

Final version. To appear in the L'Enseignement Math\'ematique memorial volume for Vaughan Jones

R2 v1 2026-06-24T09:19:51.835Z