K-theory of the maximal and reduced Roe algebras of metric spaces with A-by-CE coarse fibrations
Abstract
Let X be a discrete metric space with bounded geometry. We show that if X admits an "A-by-CE coarse fibration", then the canonical quotient map λ: C*(X) C*(X) from the maximal Roe algebra to the Roe algebra of X, and the canonical quotient map λ: C*u, (X) C*u(X) from the maximal uniform Roe algebra to the uniform Roe algebra of X, induce isomorphisms on K-theory. A typical example of such a space arises from a sequence of group extensions \1 Nn Gn Qn 1\ such that the sequence \Nn\ has Yu's property A, and the sequence \Qn\ admits a coarse embedding into Hilbert space. This extends an early result of J. Spakula and R. Willett JR2013 to the case of metric spaces which may not admit a coarse embedding into Hilbert space. Moreover, it implies that the maximal coarse Baum-Connes conjecture holds for a large class of metric spaces which may not admit a fibred coarse embedding into Hilbert space.
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