Motivic spectral sequence for relative homotopy K-theory

Abstract

We construct a motivic spectral sequence for the relative homotopy invariant K-theory of a closed immersion of schemes D ⊂ X. The E2-terms of this spectral sequence are the cdh-hypercohomology of a complex of equi-dimensional cycles. Using this spectral sequence, we obtain a cycle class map from the relative motivic cohomology group of 0-cycles to the relative homotopy invariant K-theory. For a smooth scheme X and a divisor D ⊂ X, we construct a canonical homomorphism from the Chow groups with modulus i(X|D) to the relative motivic cohomology groups H2i(X|D, (i)) appearing in the above spectral sequence. This map is shown to be an isomorphism when X is affine and i = (X).