English

Cone-equivalent nilpotent groups with different Dehn functions

Group Theory 2023-08-24 v3 Differential Geometry Geometric Topology Metric Geometry

Abstract

For every k3k\geqslant 3, we exhibit a simply connected kk-nilpotent Lie group NkN_k whose Dehn function behaves like nkn^k, while the Dehn function of its associated Carnot graded group gr(Nk)\mathsf{gr}(N_k) behaves like nk+1n^{k+1}. This property and its consequences allow us to reveal three new phenomena. First, since those groups have uniform lattices, this provides the first examples of pairs of finitely presented groups with bilipschitz asymptotic cones but with different Dehn functions. The second surprising feature of these groups is that for every even integer k4k \geqslant 4 the centralized Dehn function of NkN_k behaves like nk1n^{k-1} and so has a different exponent than the Dehn function. This answers a question of Young. Finally, we turn our attention to sublinear bilipschitz equivalences (SBE). Introduced by Cornulier, these are maps between metric spaces inducing bi-Lipschitz homeomorphisms between their asymptotic cones. These can be seen as weakenings of quasiisometries where the additive error is replaced by a sublinearly growing function vv. We show that a vv-SBE between NkN_k and gr(Nk)\mathsf{gr}(N_k) must satisfy v(n)n1/(2k+2)v(n)\succcurlyeq n^{1/(2k + 2)}, strengthening the fact that those two groups are not quasiisometric. This is the first instance where an explicit lower bound is provided for a pair of SBE groups.

Keywords

Cite

@article{arxiv.2008.01211,
  title  = {Cone-equivalent nilpotent groups with different Dehn functions},
  author = {Claudio Llosa Isenrich and Gabriel Pallier and Romain Tessera},
  journal= {arXiv preprint arXiv:2008.01211},
  year   = {2023}
}

Comments

64 pages.v3: final version, minor corrections and improvements to the exposition

R2 v1 2026-06-23T17:37:02.927Z