A note on Lawson homology for smooth varieties with small Chow groups
Abstract
Let X be a smooth projective variety of dimension n on which rational and homological equivalence coincide for algebraic p-cycles in the range 0≤ p≤ s. We show that the homologically trivial sector of rational Lawson homology LpHk(X,Q)hom vanishes for 0≤ n-p≤ s+2. This is an analogue of a theorem of C. Peters in "dual dimensions". Together with Peters' theorem we get that the natural transformation LpHk(X,Q)--> Hk(X,Q) is injective for all p and k when X is a smooth projective variety of dimension 4 and Ch0(X) =Z.
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