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An ultrapower construction of the multiplier algebra of a $C^{\ast}$-algebra and an application to boundary amenability of groups

Published 18 Mar 2019 in math.OA and math.LO | (1903.07249v3)

Abstract: Using ultrapowers of $C{\ast}$-algebras we provide a new construction of the multiplier algebra of a $C{\ast}$-algebra. This extends the work of Avsec and Goldbring [Houston J. Math., to appear, arXiv:1610.09276.] to the setting of noncommutative and nonseparable $C{\ast}$-algebras. We also extend their work to give a new proof of the fact that groups that act transitively on locally finite trees with boundary amenable stabilizers are boundary amenable.

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