English

Edifices: Building-like spaces associated to linear algebraic groups

Group Theory 2024-04-24 v3 Metric Geometry

Abstract

Given a semisimple linear algebraic kk-group GG, one has a spherical building ΔG\Delta_G, and one can interpret the geometric realisation ΔG(R)\Delta_G(\mathbb R) of ΔG\Delta_G in terms of cocharacters of GG. The aim of this paper is to extend this construction to the case when GG is an arbitrary connected linear algebraic group; we call the resulting object ΔG(R)\Delta_G(\mathbb R) the spherical edifice of GG. We also define an object VG(R)V_G(\mathbb R) which is an analogue of the vector building for a semisimple group; we call VG(R)V_G(\mathbb R) the vector edifice. The notions of a linear map and an isomorphism between edifices are introduced; we construct some linear maps arising from natural group-theoretic operations. We also devise a family of metrics on VG(R)V_G(\mathbb R) and show they are all bi-Lipschitz equivalent to each other; with this extra structure, VG(R)V_G(\mathbb R) becomes a complete metric space. Finally, we present some motivation in terms of geometric invariant theory and variations on the Tits Centre Conjecture.

Keywords

Cite

@article{arxiv.2305.11770,
  title  = {Edifices: Building-like spaces associated to linear algebraic groups},
  author = {Michael Bate and Benjamin Martin and Gerhard Roehrle},
  journal= {arXiv preprint arXiv:2305.11770},
  year   = {2024}
}

Comments

45 pages; to appear in special issue of Innovations in Incidence Geometry, dedicated to the memory of Jacques Tits; v2 small fixes in sect. 6.2; v3 small fixes

R2 v1 2026-06-28T10:39:24.511Z