Zariski-local framed A1-homotopy theory

Abstract

For any (not necessarily perfect) field k we obtain equivalences of ∞-categories \[Hfr,gp(k) Hfr,gpzf(k) and DM(k)DMzar(k).\] We also construct an equivalence of ∞-categories \[ Hfr,gp(S) Hfr,gpzf(S) \] of group-like framed motivic spaces over a separated noetherian scheme S of finite Krull dimension with respect to the Nisnevich topology at one side and the Zariski fibre topology zf generated by the Zariski one and the trivial fibre topology (introduced by Druzhinin, Kolderup and stvr) on the other side. Over a field, the Zariski fibre topology equals the Zariski topology and the result follows from the previous one. To prove it in the case of a general base scheme, we prove a localisation theorem for Hfr,gpzf(-) employing the ideas from the proof of the affine localisation theorem for the trivial fibre topology by the first author, Kolderup and stvr.