Grothendieck-Witt theory of derived schemes

Abstract

We construct a non-A1-invariant motivic ring spectrum KO over Spec(Z), whose associated cohomology theory on qcqs derived schemes is the Grothendieck-Witt theory of classical symmetric forms (as opposed to homotopy symmetric forms). In particular, we show that this theory satisfies Nisnevich descent, smooth blowup excision, a projective bundle formula, and is locally left Kan extended from smooth Z-schemes up to Bass delooping. More generally, our construction produces KO-modules representing localizing invariants of two different families of Poincar\'e structures on derived schemes, which we call "classical" and "genuine"; the latter Poincar\'e structures are defined for spectral schemes with involution, but the former only for derived schemes. We then establish basic properties of these motivic spectra. As in A1-homotopy theory, the fracture square of KO with respect to the Hopf element recovers the fundamental cartesian square relating GW-theory, L-theory, and K-theory. A new phenomenon when 2 is not a unit is that KO is not Bott-periodic, and the left and right Bott periodizations of KO represent the Grothendieck-Witt theories of homotopy symmetric and homotopy quadratic forms, respectively. We also construct the expected metalinear E∞-orientation of KO. Finally, we show that the A1-localization of KO recovers the motivic spectrum recently constructed by Calm\`es, Harpaz, and Nardin.