On the weight zero motivic cohomology
Abstract
We prove that singular cohomology of the underlying space of Berkovich's analytification of a scheme X locally of finite type over a trivially-valued field k of characteristic 0 is isomorphic to cdh-cohomology with integer coefficients which is also isomorphic to the weight zero motivic cohomology H*(X, Z). Using this isomorphism, we demonstrate the vanishing of RHomShNis(cork)(G,Z), where G denotes the Nisnevich sheaf with transfers associated with a commutative algebraic group G over k. For abelian k-varieties A and B, we prove that RHomPShtr(A,B) is isomorphic to HomAbk(A,B).
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