English

Panel collapse and its applications

Group Theory 2020-01-29 v3

Abstract

We describe a procedure called panel collapse for replacing a CAT(0) cube complex Ψ\Psi by a "lower complexity" CAT(0) cube complex Ψ\Psi_\bullet whenever Ψ\Psi contains a codimension-22 hyperplane that is extremal in one of the codimension-11 hyperplanes containing it. Although Ψ\Psi_\bullet is not in general a subcomplex of Ψ\Psi, it is a subspace consisting of a subcomplex together with some cubes that sit inside Ψ\Psi "diagonally". The hyperplanes of Ψ\Psi_\bullet extend to hyperplanes of Ψ\Psi. Applying this procedure, we prove: if a group GG acts cocompactly on a CAT(0) cube complex Ψ\Psi, then there is a CAT(0) cube complex Ω\Omega so that GG acts cocompactly on Ω\Omega and for each hyperplane HH of Ω\Omega, the stabiliser in GG of HH acts on HH essentially. Using panel collapse, we obtain a new proof of Stallings's theorem on groups with more than one end. As another illustrative example, we show that panel collapse applies to the exotic cubulations of free groups constructed by Wise. Next, we show that the CAT(0) cube complexes constructed by Cashen-Macura can be collapsed to trees while preserving all of the necessary group actions. (It also illustrates that our result applies to actions of some non-discrete groups.) We also discuss possible applications to quasi-isometric rigidity for certain classes of graphs of free groups with cyclic edge groups. Panel collapse is also used in forthcoming work of the first-named author and Wilton to study fixed-point sets of finite subgroups of Out(Fn)\mathrm{Out}(F_n) on the free splitting complex. Finally, we apply panel collapse to a conjecture of Kropholler, obtaining a short proof under a natural extra hypothesis.

Cite

@article{arxiv.1712.06553,
  title  = {Panel collapse and its applications},
  author = {Mark F. Hagen and Nicholas W. M. Touikan},
  journal= {arXiv preprint arXiv:1712.06553},
  year   = {2020}
}

Comments

Revised according to referee comments. This version accepted in "Groups, Geometry, and Dynamics"

R2 v1 2026-06-22T23:21:57.994Z