Alexandrov groupoids and the nuclear dimension of twisted groupoid C^⁎-algebras

We consider a twist E over an étale groupoid G. When G is principal, we prove that the nuclear dimension of the reduced twisted groupoid C^⁎-algebra is bounded by a number depending on the dynamic asymptotic dimension of G and the topological covering dimension of its unit space. This generalizes an analogous theorem by Guentner, Willett, and Yu for the C^⁎-algebra of G. Our proof uses a reduction to the unital case where G has compact unit space, via a construction of “groupoid unitizations” G˜ and E˜ of G and E such that E˜ is a twist over G˜. The construction of G˜ is for r-discrete (hence for étale) groupoids G which are not necessarily principal. When G is étale, the dynamic asymptotic dimension of G and G˜ coincide. We show that the minimal unitizations of the full and reduced twisted groupoid C^⁎-algebras of the twist over G are isomorphic to the twisted groupoid C^⁎-algebras of the twist over G˜. We apply our result about the nuclear dimension of the twisted groupoid C^⁎-algebra to obtain a similar bound on the nuclear dimension of the C^⁎-algebra of an étale groupoid with closed orbits and abelian stability subgroups that vary continuously.