Framed motives of smooth affine pairs

Abstract

The theory of framed motives by Garkusha and Panin gives computations in the stable motivic homotopy category SH(k) in terms of Voevodsky's framed correspondences. In particular the motivically fibrant -resolution in positive degrees of the motivic suspension spectrum P1∞ X+, where X+=X *, for a smooth scheme X∈ Smk over an infinite perfect field k, is computed. The computation by Garkusha, Neshitov and Panin of the framed motives of relative motivic spheres ( Al× X,( Al-0)× X), X∈ Smk, is one of ingredients in the theory. In the article we extend this result to the case of a pair (X,U) given by a smooth affine variety X over k and an open subscheme U⊂ X. The result gives the explicit motivically fibrant -resolution in positive degrees for the motivic suspension spectrum P1∞ (X+/U+) of the factor-sheaf X+/U+.