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$K$-theory of ghostly ideals for $\ell^p$-coarsely embeddable spaces

Published 27 Nov 2025 in math.KT, math.FA, and math.OA | (2511.22438v1)

Abstract: Let $X$ be a metric space with bounded geometry. We show that if $X$ admits a coarse embedding into an $\ellp$-space ($1 \le p < \infty$), then the canonical inclusion from any geometric ideal to the corresponding ghostly ideal induces an isomorphism in $K$-theory. Our approach relies on the construction of twisted Roe algebras, avoiding the use of groupoid techniques. As consequences, we deduce the relative (maximal) coarse Baum-Connes conjectures for such spaces, as well as the Operator Norm Localization property for finite rank projections ($ONL_{\mathcal{P}_{Fin}}$).

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