Unramified logarithmic Hodge-Witt cohomology and P1-invariance
Abstract
Let X be a smooth proper variety over a field k and suppose that the degree map CH0(X k K) Z is isomorphic for any field extension K/k. We show that G(Spec k) G(X) is an isomorphism for any P1-invariant Nisnevich sheaf with transfers G. This generalize a result of Binda-R\"ulling-Saito that proves the same conclusion for reciprocity sheaves. We also give a direct proof of the fact that the unramified logarithmic Hodge-Witt cohomology is a P1-invariant Nisnevich sheaf with transfers.
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