English

A note on secondary K-theory

K-Theory and Homology 2016-02-08 v5 Algebraic Geometry Algebraic Topology Rings and Algebras Representation Theory

Abstract

We prove that Toen's secondary Grothendieck ring is isomorphic to the Grothendieck ring of smooth proper pretriangulated dg categories previously introduced by Bondal, Larsen and Lunts. Along the way, we show that those short exact sequences of dg categories in which the first term is smooth proper and the second term is proper are necessarily split. As an application, we prove that the canonical map from the derived Brauer group to the secondary Grothendieck ring has the following injective properties: in the case of a commutative ring of characteristic zero, it distinguishes between dg Azumaya algebras associated to non-torsion cohomology classes and dg Azumaya algebras associated to torsion cohomology classes (=ordinary Azumaya algebras); in the case of a field of characteristic zero, it is injective; in the case of a field of positive characteristic p>0, it restricts to an injective map on the p-primary component of the Brauer group.

Keywords

Cite

@article{arxiv.1506.00916,
  title  = {A note on secondary K-theory},
  author = {Goncalo Tabuada},
  journal= {arXiv preprint arXiv:1506.00916},
  year   = {2016}
}

Comments

Revised version. New result: when the base field is of characteristic zero, the canonical map from the Brauer group to the secondary Grothendieck ring is injective

R2 v1 2026-06-22T09:45:53.078Z