Steinberg Algebras of Ample Semicategories and their Boolean-Cartan Restriction Semigroups

Abstract

We extend the construction of Steinberg algebras of ample groupoids to étale semicategories. We also relate ample semicategories to Boolean restriction semigroups via a representation result extending previously known results for categories. Furthermore, we prove a reconstruction result which characterises an abstract algebra A with a certain Cartan-like restriction subsemigroup B (subject to conditions resembling those defining quasi-Cartan pairs) as the Steinberg algebra of the ultrafilter groupoid of B. In this way we obtain a twist-free extension of previous Steinberg algebra reconstruction results.