Lattices, injective metrics and the K(π,1) conjecture

Abstract

Starting with a lattice with an action of Z or R, we build a Helly graph or an injective metric space. We deduce that the ∞ orthoscheme complex of any bounded graded lattice is injective. We also prove a Cartan-Hadamard result for locally injective metric spaces. We apply this to show that any Garside group or any FC type Artin group acts on an injective metric space and on a Helly graph. We also deduce that the natural piecewise ∞ metric on any Euclidean building of type An extended, Bn, Cn or Dn is injective, and its thickening is a Helly graph. Concerning Artin groups of Euclidean types An and Cn, we show that the natural piecewise ∞ metric on the Deligne complex is injective, the thickening is a Helly graph, and it admits a convex bicombing. This gives a metric proof of the K(π,1) conjecture, as well as several other consequences usually known when the Deligne complex has a CAT(0) metric.