Cdh Descent for Homotopy Hermitian K-Theory of Rings with Involution

Abstract

We provide a geometric model for the classifying space of automorphism groups of Hermitian vector bundles over a ring with involution R such that 12 ∈ R; this generalizes a result of Schlichting-Tripathi SchTri. We then prove a periodicity theorem for Hermitian K-theory and use it to construct an E∞ motivic ring spectrum KRalg representing homotopy Hermitian K-theory. From these results, we show that KRalg is stable under base change, and cdh descent for homotopy Hermitian K-theory of rings with involution is a formal consequence.