A note on Grothendieck’s standard conjectures of type C⁺ and D

Author(s)

Trigo Neri Tabuada, Goncalo Jorge

Abstract

Grothendieck conjectured in the sixties that the even Künneth projector (with respect to a Weil cohomology theory) is algebraic and that the homological equivalence relation on algebraic cycles coincides with the numerical equivalence relation. In this note we extend these celebrated conjectures from smooth projective schemes to the broad setting of smooth proper dg categories. As an application, we prove that Grothendieck's conjectures are invariant under homological projective duality. This leads to a proof of Grothendieck's original conjectures in the case of intersections of quadrics and linear sections of determinantal varieties. Along the way, we also prove the case of quadric fibrations and intersections of bilinear divisors.

Date issued

2018-01

URI

http://hdl.handle.net/1721.1/116036

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Proceedings of the American Mathematical Society

Publisher

American Mathematical Society (AMS)

Citation

Tabuada, Gonçalo. “A note on Grothendieck’s standard conjectures of type C⁺ and D.” Proceedings of the American Mathematical Society 146, 4 (January 12, 2018): 1389–1399 © 2018 American Mathematical Society

Version: Final published version

ISSN

0002-9939

1088-6826