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complex varieties for which the chow group mod n is not finite

Publication ,  Journal Article
Schoen, C
Published in: Journal of Algebraic Geometry
January 1, 2002

Using the recent work of S. Bloch and H. Esnault, we give examples of smooth projective varieties W/ℚ and integers n ≠ 0 for which CH2(Wℚ)/nCH2(Wℚ) is not a finite group.

Duke Scholars

Published In

Journal of Algebraic Geometry

DOI

ISSN

1056-3911

Publication Date

January 1, 2002

Volume

11

Issue

1

Start / End Page

41 / 100

Related Subject Headings

  • General Mathematics
  • 4904 Pure mathematics
  • 0101 Pure Mathematics
 

Citation

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MLA
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Schoen, C. (2002). complex varieties for which the chow group mod n is not finite. Journal of Algebraic Geometry, 11(1), 41–100. https://doi.org/10.1090/S1056-3911-01-00291-0
Schoen, C. “complex varieties for which the chow group mod n is not finite.” Journal of Algebraic Geometry 11, no. 1 (January 1, 2002): 41–100. https://doi.org/10.1090/S1056-3911-01-00291-0.
Schoen C. complex varieties for which the chow group mod n is not finite. Journal of Algebraic Geometry. 2002 Jan 1;11(1):41–100.
Schoen, C. “complex varieties for which the chow group mod n is not finite.” Journal of Algebraic Geometry, vol. 11, no. 1, Jan. 2002, pp. 41–100. Scopus, doi:10.1090/S1056-3911-01-00291-0.
Schoen C. complex varieties for which the chow group mod n is not finite. Journal of Algebraic Geometry. 2002 Jan 1;11(1):41–100.
Journal cover image

Published In

Journal of Algebraic Geometry

DOI

ISSN

1056-3911

Publication Date

January 1, 2002

Volume

11

Issue

1

Start / End Page

41 / 100

Related Subject Headings

  • General Mathematics
  • 4904 Pure mathematics
  • 0101 Pure Mathematics