Effective Grothendieck-Witt motives of smooth varieties
Abstract
The category of effective Grothendieck-Witt-motives DMGWeff,-(k) (and Witt-motives DMWeff,-(k)) by Voevodsky-Suslin method starting with some category of GW-correspondences (and Witt-correspondences) over a perfect field k, char\,k≠ 2, is defined. The functor MGWeff Smk DMGWeff,-(k) of Grothendieck-Witt-motives of smooth varieties is computed and it is proved that for any smooth scheme X and homotopy invariant sheave with GW-transfers F HomDMGWeff,-(k)(MGWeff(X), F[i]) Hinis(X, F) naturally in X and F.
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