Unstable \'etale motives

Abstract

We prove a rigidity result for certain p-complete \'etale A1-invariant sheaves of anima over a qcqs finite-dimensional base scheme S of bounded \'etale cohomological dimension with p invertible on S. This generalizes results of Suslin--Voevodsky, Ayoub, Cisinski--D\'eglise, and Bachmann to the unstable setting. Over a perfect field we exhibit a large class of sheaves to which our main theorem applies, in particular the p-completion of the \'etale sheafification of any 2-effective 2-connective motivic space, as well as the p-completion of any 4-connective A1-invariant \'etale sheaf. We use this rigidity result to prove (a weaker version of) an \'etale analog of Morel's theorem stating that for a Nisnevich sheaf of abelian groups, strong A1-invariance implies strict A1-invariance. Moreover, this allows us to construct an unstable \'etale realization functor on 2-effective 2-connective motivic spaces.