TY - JOUR
T1 - Noncommutative motives in positive characteristic and their applications
AU - Tabuada, Gonçalo
N1 - Funding Information:
info:eu-repo/grantAgreement/FCT/6817 - DCRRNI ID/UID%2FMAT%2F00297%2F2019/PT#
The author was partially supported by a NSF CAREER Award #1350472 and by the Fundação para a Ciência e a Tecnologia (Portuguese Foundation for Science and Technology) through the project UID/MAT/00297/2019 (Centro de Matemática e Aplicações). The author is grateful to Lars Hesselholt for useful discussions concerning topological periodic cyclic homology and for comments on a previous version of Corollaries 5.10 and 5.12. The author is also grateful to Maxim Kontsevich for comments on a previous version of Theorem 4.10 and for pointing out Remark 4.13. The author also would like to thank the anonymous referee for his/her comments, and to the Mittag-Leffler Institute and to the Hausdorff Research Institute for Mathematics for their hospitality.
Publisher Copyright:
© 2019 Elsevier Inc.
PY - 2019/6/20
Y1 - 2019/6/20
N2 - Let k be a base field of positive characteristic. Making use of topological periodic cyclic homology, we start by proving that the category of noncommutative numerical motives over k is abelian semi-simple, as conjectured by Kontsevich. Then, we establish a far-reaching noncommutative generalization of the Weil conjectures, originally proven by Dwork and Grothendieck. In the same vein, we establish a far-reaching noncommutative generalization of the cohomological interpretations of the Hasse-Weil zeta function, originally proven by Hesselholt. As a third main result, we prove that the numerical Grothendieck group of every smooth proper dg category is a finitely generated free abelian group, as claimed (without proof) by Kuznetsov. Then, we introduce the noncommutative motivic Galois (super-)groups and, following an insight of Kontsevich, relate them to their classical commutative counterparts. Finally, we explain how the motivic measure induced by Berthelot's rigid cohomology can be recovered from the theory of noncommutative motives.
AB - Let k be a base field of positive characteristic. Making use of topological periodic cyclic homology, we start by proving that the category of noncommutative numerical motives over k is abelian semi-simple, as conjectured by Kontsevich. Then, we establish a far-reaching noncommutative generalization of the Weil conjectures, originally proven by Dwork and Grothendieck. In the same vein, we establish a far-reaching noncommutative generalization of the cohomological interpretations of the Hasse-Weil zeta function, originally proven by Hesselholt. As a third main result, we prove that the numerical Grothendieck group of every smooth proper dg category is a finitely generated free abelian group, as claimed (without proof) by Kuznetsov. Then, we introduce the noncommutative motivic Galois (super-)groups and, following an insight of Kontsevich, relate them to their classical commutative counterparts. Finally, we explain how the motivic measure induced by Berthelot's rigid cohomology can be recovered from the theory of noncommutative motives.
KW - Motivic Galois (super-)groups
KW - Noncommutative algebraic geometry
KW - Noncommutative motives
KW - Regularized determinants
KW - Weil conjectures
KW - Zeta functions
UR - http://www.scopus.com/inward/record.url?scp=85064556027&partnerID=8YFLogxK
U2 - 10.1016/j.aim.2019.04.020
DO - 10.1016/j.aim.2019.04.020
M3 - Article
AN - SCOPUS:85064556027
SN - 0001-8708
VL - 349
SP - 648
EP - 681
JO - Advances In Mathematics
JF - Advances In Mathematics
ER -