info:eu-repo/semantics/article
An ultrapower construction of the multiplier algebra of a C*-algebra with an application to boundary amenability of groups
Fecha
2019-05Registro en:
Poggi, Facundo Sebastian; Sasyk, Roman; An ultrapower construction of the multiplier algebra of a C*-algebra with an application to boundary amenability of groups; Mashhad Tusi Mathematical Research Group; Advances in Operator Theory; 4; 4; 5-2019; 852-864
2538-225X
CONICET Digital
CONICET
Autor
Poggi, Facundo Sebastian
Sasyk, Roman
Resumen
Using ultrapowers of C-algebras, we provide a new construction of the multiplier algebra of a C-algebra. This extends the work of Avsec and Goldbring [Houston J. Math., to appear, arXiv:1610.09276] to the setting ofnoncommutative and nonseparable C-algebras. We also extend their work to give a new proof of the fact that groups acting transitively on locally finite trees with boundary amenable stabilizers are boundary amenable.