Realizability of fusion systems by discrete groups: II

Abstract: We compare four different types of realizability for saturated fusion systems over discrete $p$-toral groups. For example, when $G$ is a locally finite group all of whose $p$-subgroups are artinian (hence discrete $p$-toral), we show that it has ``weakly Sylow'' $p$-subgroups and give explicit constructions of saturated fusion systems and associated linking systems associated to $G$. We also show that a fusion system over a discrete $p$-toral group $S$ is saturated if its set of morphisms is closed under a certain topology and the finite subgroups of $S$ satisfy the saturation axioms, and prove a version of the Cartan-Eilenberg stable elements theorem for locally finite groups.