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edited Mar 2, 2017 at 11:53

Mikhail Bondarko

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Blow-up and the Chow group of zero cycles

Let $\tilde{X}\to X$ be a blow-up of a variety $X$ (over an algebraically closed field).

Is it true that the Chow group of zero cycles of $\tilde{X}$ is isomorphic to that of $X$? What if $X$ is a smooth variety?

ag.algebraic-geometry intersection-theory algebraic-cycles

asked Mar 2, 2017 at 9:34

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