We propose a categorification of the Chern character that refines earlier work of Toën and Vezzosi and of Ganter and Kapranov. If X is an algebraic stack, our categorified Chern character is a symmetric monoidal functor from a category of mixed noncommutative motives over X, which we introduce, to S1-equivariant perfect complexes on the derived free loop stack LX. As an application of the theory, we show that Toën and Vezzosi's secondary Chern character factors through secondary K-theory. Our techniques depend on a careful investigation of the functoriality of traces in symmetric monoidal (∞,n)-categories, which is of independent interest.
Higher traces, noncommutative motives, and the categorified Chern character / Hoyois, M.; Scherotzke, S.; Sibilla, N.. - In: ADVANCES IN MATHEMATICS. - ISSN 0001-8708. - 309:(2017), pp. 97-154. [10.1016/j.aim.2017.01.008]
Higher traces, noncommutative motives, and the categorified Chern character
Sibilla N.
2017-01-01
Abstract
We propose a categorification of the Chern character that refines earlier work of Toën and Vezzosi and of Ganter and Kapranov. If X is an algebraic stack, our categorified Chern character is a symmetric monoidal functor from a category of mixed noncommutative motives over X, which we introduce, to S1-equivariant perfect complexes on the derived free loop stack LX. As an application of the theory, we show that Toën and Vezzosi's secondary Chern character factors through secondary K-theory. Our techniques depend on a careful investigation of the functoriality of traces in symmetric monoidal (∞,n)-categories, which is of independent interest.File | Dimensione | Formato | |
---|---|---|---|
revision.pdf
accesso aperto
Tipologia:
Documento in Pre-print
Licenza:
Non specificato
Dimensione
555.31 kB
Formato
Adobe PDF
|
555.31 kB | Adobe PDF | Visualizza/Apri |
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.