CAT(0) Polygonal Complexes are 2-Median
Abstract
Median spaces are spaces in which for every three points the three intervals between them intersect at a single point. It is well known that rank-1 affine buildings are median spaces, but by a result of Haettel, higher rank buildings are not even coarse median. We define the notion of ``2-median space'', which roughly says that for every four points the minimal discs filling the four geodesic triangles they span intersect in a point or a geodesic segment. We show that CAT(0) Euclidean polygonal complexes, and in particular rank-2 affine buildings, are 2-median. In the appendix, we recover a special case of a result of Stadler of a Fary-Milnor type theorem and show in elementary tools that a minimal disc filling a geodesic triangle is injective.
Cite
@article{arxiv.2212.00894,
title = {CAT(0) Polygonal Complexes are 2-Median},
author = {Shaked Bader and Nir Lazarovich},
journal= {arXiv preprint arXiv:2212.00894},
year = {2023}
}
Comments
42 pages, 30 figures; final version - published in Geometriae Dedicata