Pureness and stable rank one for reduced twisted group C-algebras of certain group extensions

Abstract

The purpose of this note is to prove two results. First, we observe that discrete groups with property PPHP in the sense of Ozawa give rise to completely selfless reduced twisted group C-algebras, thereby extending a theorem of Ozawa from the untwisted to the twisted case. We also observe that an adaptation of property PPHP for an inclusion of groups implies that the associated inclusion of reduced twisted group C-algebras is selfless in the sense of Hayes-Kunnawalkam Elayavalli-Patchell-Robert. Second, we show that reduced (twisted) C-algebras of some group extensions of the form finite-by-G, with G having the property PPHP, have stable rank one and are pure, which implies strict comparison. Our results do not assume rapid decay, and extend a theorem of Raum-Thiel-Vilalta. Examples covered by our results include reduced twisted group C-algebras of all acylindrically hyperbolic groups and all lattices in SL(n, R) for n≥2.