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VANISHING OF THE NEGATIVE HOMOTOPY $K$-THEORY OF QUOTIENT SINGULARITIES

Part of: $K$-theory in geometry Curves Local theory Algebraic geometry: Foundations Higher algebraic $K$-theory

Published online by Cambridge University Press:  08 May 2017

Gonçalo Tabuada
Gonçalo Tabuada*
Affiliation:
Department of Mathematics, MIT, Cambridge, MA 02139, USA Departamento de Matemática, FCT, UNL, Portugal Centro de Matemática e Aplicaçōes (CMA), FCT, UNL, Portugal ([email protected]) URL: http://math.mit.edu/∼tabuada
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Abstract

Making use of Gruson–Raynaud’s technique of ‘platification par éclatement’, Kerz and Strunk proved that the negative homotopy $K$-theory groups of a Noetherian scheme $X$ of Krull dimension $d$ vanish below $-d$. In this article, making use of noncommutative algebraic geometry, we improve this result in the case of quotient singularities by proving that the negative homotopy $K$-theory groups vanish below $-1$. Furthermore, in the case of cyclic quotient singularities, we provide an explicit ‘upper bound’ for the first negative homotopy $K$-theory group.

Keywords

K-theorysingularitiesnoncommutative algebraic geometry

MSC classification

Primary: 14A22: Noncommutative algebraic geometry 14B05: Singularities 14H20: Singularities, local rings 19E08: $K$-theory of schemes 19D35: Negative $K$-theory, NK and Nil
Type
Research Article
Information
Journal of the Institute of Mathematics of Jussieu , Volume 18 , Issue 3 , May 2019 , pp. 619 - 627
Copyright
© Cambridge University Press 2017 

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Footnotes

The author was partially supported by the National Science Foundation Award #1350472 and by the Portuguese Foundation for Science and Technology grant PEst-OE/MAT/UI0297/2014.

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