English

Purity in chromatically localized algebraic $K$-theory

K-Theory and Homology 2024-07-30 v5 Algebraic Topology

Abstract

We prove a purity property in telescopically localized algebraic KK-theory of ring spectra: For n1n\geq 1, the T(n)T(n)-localization of K(R)K(R) only depends on the T(0)T(n)T(0)\oplus \dots \oplus T(n)-localization of RR. This complements a classical result of Waldhausen in rational KK-theory. Combining our result with work of Clausen--Mathew--Naumann--Noel, one finds that LT(n)K(R)L_{T(n)}K(R) in fact only depends on the T(n1)T(n)T(n-1)\oplus T(n)-localization of RR, again for n1n \geq 1. As consequences, we deduce several vanishing results for telescopically localized KK-theory, as well as an equivalence between K(R)K(R) and TC(τ0R)\mathrm{TC}(\tau_{\geq 0} R) after T(n)T(n)-localization for n2n\geq 2.

Keywords

Cite

@article{arxiv.2001.10425,
  title  = {Purity in chromatically localized algebraic $K$-theory},
  author = {Markus Land and Akhil Mathew and Lennart Meier and Georg Tamme},
  journal= {arXiv preprint arXiv:2001.10425},
  year   = {2024}
}

Comments

v5: accepted version; v4:new introduction, updated references, 26 pages; v3: New author, new title; this is an almost completely rewritten version of the paper that was previously entitled `Vanishing results for chromatic localizations of algebraic K-theory'. In particular, we affirmatively answer a question about purity for telescopically localized algebraic K-theory from the previous version

R2 v1 2026-06-23T13:23:05.970Z