Descent and cyclotomic redshift for chromatically localized algebraic K-theory

Abstract

We prove that T(n+1)-localized algebraic K-theory satisfies descent for π-finite p-group actions on stable ∞-categories of chromatic height up to n, extending a result of Clausen-Mathew-Naumann-Noel for finite p-groups. Using this, we show that it sends T(n)-local Galois extensions to T(n+1)-local Galois extensions. Furthermore, we show that it sends cyclotomic extensions of height n to cyclotomic extensions of height n+1, extending a result of Bhatt-Clausen-Mathew for n=0. As a consequence, we deduce that K(n+1)-localized K-theory satisfies hyperdescent along the cyclotomic tower of any T(n)-local ring. Counterexamples to such cyclotomic hyperdescent for T(n+1)-localized K-theory were constructed by Burklund, Hahn, Levy and the third author, thereby disproving the telescope conjecture.