E[subscript n]-Regularity Implies E[subscript n-1]-Regularity

Author(s)

Trigo Neri Tabuada, Goncalo Jo

Abstract

Vorst and Dayton-Weibel proved that K[subscript n]-regularity implies K[subscript n−1]-regularity. In this article we generalize this result from (commutative) rings to differential graded categories and from algebraic K-theory to any functor which is Morita invariant, continuous, and localizing. Moreover, we show that regularity is preserved under taking desuspensions, fibers of morphisms, direct factors, and arbitrary direct sums. As an application, we prove that the above implication also holds for schemes. Along the way, we extend Bass’ fundamental theorem to this broader setting and establish a Nisnevich descent result which is of independent interest.

Date issued

2014

URI

http://hdl.handle.net/1721.1/93241

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Documenta Mathematica

Publisher

European Math Society

Citation

Tabuada, Goncalo. "E[subscript n]-Regularity Implies E[subscript n-1]-Regularity." Documenta Mathematica 19 (2014), 121-139.

Version: Original manuscript

ISSN

1431-0635

1431-0643