Combination theorems in convex projective geometry
Abstract
We prove a general combination theorem for discrete subgroups of preserving properly convex open subsets in the projective space , in the spirit of Klein and Maskit. We use it in particular to prove that a free product of two -)linear groups is again (-)linear, and to construct Zariski-dense discrete subgroups of which are not lattices but contain a lattice of a smaller higher-rank simple Lie group. We also establish a version of our combination theorem for discrete groups that are convex cocompact in in the sense of arXiv:1704.08711. In particular, we prove that a free product of two convex cocompact groups is convex cocompact, which implies that the free product of two Anosov groups is Anosov. We also prove a virtual amalgamation theorem over convex cocompact subgroups generalizing work of Baker-Cooper.
Keywords
Cite
@article{arxiv.2407.09439,
title = {Combination theorems in convex projective geometry},
author = {Jeffrey Danciger and François Guéritaud and Fanny Kassel},
journal= {arXiv preprint arXiv:2407.09439},
year = {2025}
}
Comments
72 pages, 6 figures. Various small improvements. Added Theorems 1.11 and 1.27, expanded Section 10