A comment on the vanishing of rational motivic Borel-Moore homology
Abstract
This note concerns a weak form of Parshin's conjecture, which states that the rational motivic Borel--Moore homology of a quasiprojective variety of dimension m over a finite field in bidegree (s,t) vanishes for s>m+t. It is shown that this conjecture holds if and only if the cyclic action on the motivic cohomology of an Artin--Schreier field extension in bidegree (i,j) is trivial if i<j.
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