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Complex varieties for which the Chow group mod $n$ is not finite

Author(s): Chad Schoen
Journal: J. Algebraic Geom. 11 (2002), 41-100.
Posted: November 16, 2001
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Abstract | References | Additional information

Abstract: Using the recent work of S. Bloch and H. Esnault, we give examples of smooth projective varieties $W/\mathbb{Q} $ and integers $n\neq 0$ for which $CH^{2}(W_{\bar{\mathbb{Q} }}) /nCH^{2}(W_{\bar{\mathbb{Q} }})$ is not a finite group.

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Additional Information:

Chad Schoen
Affiliation: Department of Mathematics, Duke University, Box 90320, Durham, North Carolina 27708-0320
Email: schoen@math.duke.edu

PII: S 1056-3911(01)00291-0
Received by editor(s): December 28, 1999
Posted: November 16, 2001
Additional Notes: Partial support by NSF and NSA and hospitality of T.I.F.R. and I.H.E.S. gratefully acknowledged

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