Stable connectivity over a base

Abstract

Morel's stable connectivity theorems state that for any connective S1-spectrum F of motivic spaces (Nisnevich simplicial sheaves) over an arbitrary field, the spectrum L A1(F) is connective, and the same property for P1-spectra of motivic spaces. Here L A1 denotes the A1-localisation in the category of motivic spectra over a field k. Originally the same property was conjectured for the case of motivic S1-spectra over a base scheme S.In view of Ayoub's conterexamples the modified version of conjecture states that L A1(F) is (-d)-connective for any connective F, where d=dim S is the Krull dimension. The conjecture is proven under the infiniteness assumption on the residue fields for the cases of Dedekind schemes by J.~Schmidt and F.~Strunk and noetherian domains of arbitrary dimension by N.~Deshmukh, A.~Hogadi, G.~Kulkarni and S.~Yadavand. In the article we prove the result or general base with out the assumption on the residue fields. So by the result for any smooth scheme X over a base scheme S of Krull dimension d the Nisnevich sheaves of S1-stable motivic homotopy groups πiS1(X) and P1-stable motivic homotopy groups πi+j,j P1(X) vanishes for all i<-d.