| Popis: |
In this note, we construct an equivalence of $\infty$-categories \[ \mathbf{H}^{\mathrm{fr},\mathrm{gp}}(S) \simeq \mathbf{H}^{\mathrm{fr},\mathrm{gp}}_{\mathrm{zf}}(S) \] of group-like framed motivic spaces with respect to the Nisnevich topology and the so-called Zariski fibre topology generated by the Zariski one and the trivial fibre topology introduced by Druzhinin, Kolderup, {\O}stv{\ae}r, when $S$ is a separated noetherian scheme of finite dimension. In the base field case the Zariski fibre topology equals the Zariski topology. For a non-perfect field $k$ an equivalence of $\infty$-categories of Voevodsky's motives \[\mathbf{DM}(k)\simeq\mathbf{DM}_{\mathrm{zar}}(k)\] is new already. The base scheme case is deduced from the result over residue fields using the corresponding localisation theorems. Namely, the localisation theorem for $\mathbf{H}^{\mathrm{fr},\mathrm{gp}}(S)$ was proved by Hoyois, and the localisation theorem for $\mathbf{H}^{\mathrm{fr},\mathrm{gp}}_{\mathrm{zf}}(S)$ is deduced in the present article from the affine localisation theorem for the trivial fibre topology proved by Druzhinin, Kolderup, {\O}stw{\ae}r. |
