Motivic stable cohomotopy and unimodular rows

Abstract

We relate the group structure of van der Kallen on orbit sets of unimodular rows with values in a smooth algebra A over a field k with the motivic cohomotopy groups of the spectrum of A with coefficients in An 0 in the sense of Asok and Fasel. In the last section, we compare the motivic cohomotopy theory studied in this paper and defined by An+1 0 or, equivalently, by an A1-weakly equivalent quadric Q2n+1 to that considered by Asok and Fasel, defined by a quadric Q2n, by means of explicit morphisms Q2n+1→ Q2n, Q2n×Gm→ Q2n+1 of quadrics.