Hypercomplete \'etale framed motives and comparison of stable homotopy groups of motivic spectra and \'etale realizations over a field

Abstract

For any base field and integer l invertible in k, we prove that ∞Gm and ∞P1 commute with hyper \'etale sheafification Let and Betti realization through infinite loop space theory in motivic homotopy theory. The central subject of this article is an l-complete hypercomplete \'etale analog of the framed motives theory developed by Garkusha and Panin. Using Bachman's hypercomplete \'etale and the ∞-categorical approach of framed motivic spaces by Elmanto, Hoyois, Khan, Sosnilo, Yakerson, we prove the recognition principle and the framed motives formula for the composite functor \[opSmk SptGm-1A1,et(Smk)∞Gm Sptet,n(Smk).\] The first applications include the hypercomplete \'etale stable motivic connectivity theorem and an \'etale local isomorphism \[πA1,Nisi,j(E)πA1,eti,j(E)\] for any l-complete effective motivic spectra E, and j≥ 0. Furthermore, we obtain a new proof for Levine's comparison isomorphism over C, πi,0A1,Nis(E)(C) πi(Be(E)), and Zargar's generalization for algebraically closed fields, that applies to an arbitrary base field.