Robert Laterveer
Published 2015-07-16Version 1
What is generally known as the "Bloch--Srinivas method" consists of decomposing the diagonal of a smooth projective variety, and then considering the action of correspondences in cohomology. In this note, we observe that this same method can also be extended to singular and quasi--projective varieties. We give two applications of this observation: the first is a version of Mumford's theorem, the second is concerned with the Hodge conjecture for singular varieties.
Comments: 11 pages. Comments welcome ! To appear in Monatsh. Math. (in slightly different version)
On a multiplicative version of Mumford's theorem
Surjectivity of cycle maps for singular varieties
Yet another version of Mumford's theorem
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