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A weak Lefschetz result for Chow groups of complete intersections

Part of: $K$-theory in geometry Cycles and subschemes

Published online by Cambridge University Press:  28 December 2020

James Lewis  and
Jenan Shtayat
James Lewis*
Affiliation:
Department of Mathematical and Statistical Sciences, University of Alberta, 632 Central Academic Building Edmonton AB T6G 2G1, Canada
Jenan Shtayat
Affiliation:
Department of Mathematics, Yarmouk University, Irbid, Jordane-mail:jenan@yu.edu.jo
*
e-mail:lewisjd@ualberta.ca
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Abstract

We introduce a weak Lefschetz-type result on Chow groups of complete intersections. As an application, we can reproduce some of the results in [P]. The purpose of this paper is not to reproduce all of [P] but rather illustrate why the aforementioned weak Lefschetz result is an interesting idea worth exploiting in itself. We hope the reader agrees.

Keywords

Chow groupalgebraic cycleFano varietycomplete intersection

MSC classification

Primary: 14C35: Applications of methods of algebraic $K$-theory 14C25: Algebraic cycles 19E15: Algebraic cycles and motivic cohomology
Secondary: 14C30: Transcendental methods, Hodge theory , Hodge conjecture
Type
Article
Information
Canadian Mathematical Bulletin , Volume 64 , Issue 4 , December 2021 , pp. 1014 - 1023
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Copyright
© Canadian Mathematical Bulletin 2020

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Footnotes

The first author was partially supported by a grant from the Natural Sciences and Engineering Research Council of Canada.

References

Asakura, M., Motives and algebraic de Rham cohomology. In: Gordon, B., Lewis, J., Müller-Stach, S., Saito, S., and Yui, N. (eds.), The arithmetic and geometry of algebraic cycles, Proceedings of the CRM Summer School, June 7–19, 1998, Banff, AB, Canada, NATO Science Series, 548, Kluwer Academic Publishers, 2000.Google Scholar
Bloch, S., Algebraic cycles and higher $\ K$ -theory. Adv. Math. 61(1986), 267304.CrossRefGoogle Scholar
Borcea, C., Deforming varieties of $\ k$ -planes of projective complete intersections. Pac. J. Math. 143(1990), no. 1, 2536.CrossRefGoogle Scholar
Deligne, P., Cohomologie des intersections completes. SGA 7 (II), Exp. XI, Lecture Notes in Mathematics, 340, Springer, Heidelberg-New York-Berlin. 1973, pp. 3961.Google Scholar
Fulton, W., Intersection theory. Ergebnisse der Mathematik und ihrer Grenzgebiete. 3 Folge, Band 2, 1984, 470 pp.Google Scholar
Jannsen, U., Mixed motives and algebraic K-theory. Lecture Notes in Mathematics, 1400, Springer-Verlag, Heidelberg-New York-Berlin, 1990.Google Scholar
Jannsen, U., Motivic sheaves and filtrations on Chow groups. In: Proceedings of Symposia in Pure Mathematics, 55, 1994, pp. 245302.Google Scholar
Kleiman, S., Algebraic cycles and the Weil conjectures. In: Dix Exposés sur la cohomologie des schemes. North-Holland, Amsterdam, Masson, Paris, 1968, pp. 359386.Google Scholar
Lewis, J. D., Cylinder homomorphisms and Chow groups. Math. Nachr. 160(1993), 205221.10.1002/mana.3211600109CrossRefGoogle Scholar
Lewis, J. D., A filtration on the Chow groups of a complex projective variety. Compos. Math. 128(2001), 299322.CrossRefGoogle Scholar
Lewis, J. D. and Sertöz, A. S., Motives of Fano varieties. Math. Z. 261(2009), 531544.10.1007/s00209-008-0336-3CrossRefGoogle Scholar
Mazza, C., Voedvodsky, V., and Weibel, C., Lecture notes on motivic cohomology. Clay Math. Monogr. 2(2006), 216 pages.Google Scholar
Paranjape, K., Cohomological and cycle-theoretic connectivity. Ann. Math. 139(1994), 641660.CrossRefGoogle Scholar
Shtayat, J., Nori’s conjecture revisited. Ph.D. thesis, University of Alberta, Canada, 2018, 78 pp.Google Scholar
Tuncer, S., Representability of algebraic Chow groups of complex projective complete intersections and applications to motives. Ph.D. thesis, University of Alberta, Canada, 2011, 78 pages.Google Scholar