Higher Semiadditive Algebraic K-Theory and Redshift

Abstract

We define higher semiadditive algebraic K-theory, a variant of algebraic K-theory that takes into account higher semiadditive structure, as enjoyed for example by the K(n)- and T(n)-local categories. We prove that it satisfies a form of the redshift conjecture. Namely, that if R is a ring spectrum of height ≤ n, then its semiadditive K-theory is of height ≤ n+1. Under further hypothesis on R, which are satisfied for example by the Lubin-Tate spectrum En, we show that its semiadditive algebraic K-theory is of height exactly n+1. Finally, we connect semiadditive K-theory to T(n+1)-localized K-theory, showing that they coincide for any p-invertible ring spectrum and for the completed Johnson-Wilson spectrum E(n).