City products of right-angled buildings and their universal groups

Jens Bossaert, Tom De Medts

Published 2022-07-04Version 1

We introduce the notion of city products of right-angled buildings that produces a new right-angled building out of smaller ones. More precisely, if $M$ is a right-angled Coxeter diagram of rank $n$ and $\Delta_1,\dots,\Delta_n$ are right-angled buildings, then we construct a new right-angled building $\Delta := \mathrm{cityproduct}_M(\Delta_1,\dots,\Delta_n)$. We can recover the buildings $\Delta_1,\dots,\Delta_n$ as residues of $\Delta$, but we can also construct a skeletal building of type $M$ from $\Delta$ that captures the large-scale geometry of $\Delta$. We then proceed to study universal groups for city products of right-angled buildings, and we show that the universal group of $\Delta$ can be expressed in terms of the universal groups for the buildings $\Delta_1,\dots,\Delta_n$ and the structure of $M$. As an application, we show the existence of many examples of pairs of different buildings of the same type that admit (topologically) isomorphic universal groups, thereby vastly generalizing a recent example by Lara Be{\ss}mann.