Colocalizations of noncommutative spectra and bootstrap categories

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• 作者：Snigdhayan Mahanta ^{snigdhayan.mahanta@mathematik.uni-regensburg.de" class="auth_mail" title="E-mail the corresponding author}
• 关键词：19Dxx ; 46L85 ; 55Nxx ; 55P42 ; 46L35
• 刊名：Advances in Mathematics
• 出版年：2015
• 出版时间：5 November 2015
• 年：2015
• 卷：285
• 期：Complete
• 页码：72-100
• 全文大小：573 K

文摘

We construct a compactly generated and closed symmetric monoidal stable ∞-category NSp^′$\mathtt{N}\mathtt{S}{\mathtt{p}}^{\prime }$ and show that hNSp^′op$\mathtt{h}{\mathtt{N}\mathtt{S}{\mathtt{p}}^{\prime }}^{\mathrm{op}}$ contains the suspension stable homotopy category of separable C^⁎$C^{⁎}$-algebras ΣHo^C⁎$\mathrm{\Sigma }\mathtt{H}{\mathtt{o}}^{{\mathtt{C}}^{⁎}}$ constructed by Cuntz–Meyer–Rosenberg as a fully faithful triangulated subcategory. Then we construct two colocalizations of NSp^′$\mathtt{N}\mathtt{S}{\mathtt{p}}^{\prime }$, namely, NSp^′[K⁻¹]$\mathtt{N}\mathtt{S}{\mathtt{p}}^{\prime }[{\mathbb{K}}^{-1}]$ and NSp^′[Z⁻¹]$\mathtt{N}\mathtt{S}{\mathtt{p}}^{\prime }[{\mathcal{Z}}^{-1}]$, both of which are shown to be compactly generated and closed symmetric monoidal. We prove that Kasparov KK-category of separable C^⁎$C^{⁎}$-algebras sits inside the homotopy category of KK_∞:=NSp^′[K⁻¹]^op$\mathtt{K}{\mathtt{K}}_{\infty }:=\mathtt{N}\mathtt{S}{\mathtt{p}}^{\prime }{[{\mathbb{K}}^{-1}]}^{\mathrm{op}}$ as a fully faithful triangulated subcategory. Hence KK_∞$\mathtt{K}{\mathtt{K}}_{\infty }$ should be viewed as the stable ∞-categorical incarnation of Kasparov KK-category for arbitrary pointed noncommutative spaces (including nonseparable C^⁎$C^{⁎}$-algebras). As an application we find that the bootstrap category in hNSp^′[K⁻¹]$\mathtt{h}\mathtt{N}\mathtt{S}{\mathtt{p}}^{\prime }[{\mathbb{K}}^{-1}]$ admits a completely algebraic description. We also construct a K-theoretic bootstrap category in hKK_∞$\mathtt{h}\mathtt{K}{\mathtt{K}}_{\infty }$ that extends the construction of the UCT class by Rosenberg–Schochet. Motivated by the algebraization problem we finally analyze a couple of equivalence relations on separable C^⁎$C^{⁎}$-algebras that are introduced via the bootstrap categories in various colocalizations of NSp^′$\mathtt{N}\mathtt{S}{\mathtt{p}}^{\prime }$.