English

Densely related groups

Group Theory 2020-02-18 v2

Abstract

We study the class of densely related groups. These are finitely generated (or more generally, compactly generated locally compact) groups satisfying a strong negation of being finitely presented, in the sense that new relations appear at all scales. Here, new relations means relations that do not follow from relations of smaller size. Being densely related is a quasi-isometry invariant among finitely generated groups. We check that a densely related group has none of its asymptotic cones simply connected. In particular a lacunary hyperbolic group cannot be densely related. We prove that the Grigorchuk group is densely related. We also show that a finitely generated group that is (infinite locally finite)-by-cyclic and which satisfies a law must be densely related. Given a class C\mathcal{C} of finitely generated groups, we consider the following dichotomy: every group in C\mathcal{C} is either finitely presented or densely related. We show that this holds within the class of nilpotent-by-cyclic groups and the class of metabelian groups. In contrast, this dichotomy is no longer true for the class of 33-step solvable groups.

Keywords

Cite

@article{arxiv.1610.09469,
  title  = {Densely related groups},
  author = {Yves Cornulier and Adrien Le Boudec},
  journal= {arXiv preprint arXiv:1610.09469},
  year   = {2020}
}

Comments

28 pages. v2: Slightly reorganized exposition (implying some changes in numbering)

R2 v1 2026-06-22T16:36:03.528Z