On the K-theory of the p-adic unit disk
Abstract
In this note, we study the p-complete topological cyclic homology of the affine line relative to a ring A which is smooth over a perfectoid ring R. Denoting by NTC(A; Zp) the spectrum which measures the failure of A1-invariance on A, we observe a kind of Quillen-Lichtenbaum phenomena for NTC(A; Zp) -- that it is isomorphic to its own K(1)-localization in a specified range of degrees which depends on the relative dimension of A. Somewhat surprisingly, this range is better than considerations following from a theorem of Bhatt-Mathew and \'etale-to-syntomic comparisons. Via the Dundas-Goodwillie-McCarthy theorem, we obtain a description of the algebraic K-theory of p-completed affine line over such rings.
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