Nuclear Dimension of Twisted C*-Algebras of Virtually Abelian Groups
Abstract
Let G be a finitely generated virtually abelian group and [σ]∈ H2(G;T) such that σ(x,y) is always a root of unity. We show that the nuclear dimension of the twisted group C*-algebra C*(G,σ) is equal to the rank of a finite index abelian subgroup of G. We also show that dimnuc(C*(Zr,σ))=r if and only if σ is type I.
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