Persistence approximation property for Lp operator algebras
Abstract
In this paper, we study the persistence approximation property for quantitative K-theory of filtered Lp operator algebras. Moreover, we define quantitative assembly maps for Lp operator algebras when p∈ [1,∞). Finally, in the case of Lp crossed products and Lp Roe algebras, we find sufficient conditions for the persistence approximation property. This allows us to give some applications involving the Lp (coarse) Baum-Connes conjecture.
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