Noncommutative motives of Azumaya algebras

Author(s)

Van den Bergh, Michel; Trigo Neri Tabuada, Goncalo Jorge

Abstract

Let k be a base commutative ring, R a commutative ring of coefficients, X a quasi-compact quasi-separated k-scheme with m connected components, A a sheaf of Azumaya algebras over X of rank (r[subscript 1], . . . , r[subscript m]), and Hmo0(k)[subscript R] the category of noncommutative motives with R-coefficients. Assume that 1/r ∈ R with r := r[subscript 1] ×· · ·×r[subscript m]. Under these assumptions, we prove that the noncommutative motives with R-coefficients of X and A are isomorphic. As an application, we show that all the R-linear additive invariants of X and A are exactly the same. Examples include (nonconnective) algebraic K-theory, cyclic homology (and all its variants), topological Hochschild homology, etc. Making use of these isomorphisms, we then compute the R-linear additive invariants of differential operators in positive characteristic, of cubic fourfolds containing a plane, of Severi-Brauer varieties, of Clifford algebras, of quadrics, and of finite dimensional k-algebras of finite global dimension. Along the way we establish two results of independent interest. The first one asserts that every element α ∈ K[subscript 0](X) of rank (r[subscript 1], . . . , r[subscript m]) becomes invertible in the R-linearized Grothendieck group K[subscript 0](X)[subscript R], and the second one that every additive invariant of finite dimensional algebras of finite global dimension is unaffected under nilpotent extensions.

Date issued

2014-03

URI

http://hdl.handle.net/1721.1/104960

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Journal of the Institute of Mathematics of Jussieu

Publisher

Cambridge University Press

Citation

Tabuada, Gonçalo, and Michel Van den Bergh. “Noncommutative Motives of Azumaya Algebras.” Journal of the Institute of Mathematics of Jussieu 14.2 (2015): 379–403.

Version: Original manuscript

ISSN

1474-7480

1475-3030