Abstract
The main goal of this paper is to construct an analogue of Vo- evodsky's slice filtration in the motivic unstable homotopy category. The construction is done via birational invariants, this is motivated by the exis- tence of an equivalence of categories between the orthogonal components for Voevodsky's slice filtration and the birational motivic stable homotopy cat- egories constructed in (9). Another advantage of this approach is that the slices appear naturally as homotopy fibres (and not as in the stable setting, where they are defined as homotopy cofibres) which behave much better in the unstable setting.
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