Chromatic Cardinalities via Redshift
Abstract
Using higher descent for chromatically localized algebraic K-theory, we show that the higher semiadditive cardinality of a π-finite p-space A at the Lubin-Tate spectrum En is equal to the higher semiadditive cardinality of the free loop space LA at En-1. By induction, it is thus equal to the homotopy cardinality of the n-fold free loop space Ln A. We explain how this allows one to bypass the Ravenel-Wilson computation in the proof of the ∞-semiadditivity of the T(n)-local categories.
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