Motivic concentration theorem
Algebraic Geometry
2018-06-19 v1 Algebraic Topology
K-Theory and Homology
Representation Theory
Abstract
In this short article, given a smooth diagonalizable group scheme G of finite type acting on a smooth quasi-compact quasi-separated scheme X, we prove that (after inverting some elements of representation ring of G) all the information concerning the additive invariants of the quotient stack [X/G] is "concentrated" in the subscheme of G-fixed points X^G. Moreover, in the particular case where G is connected and the action has finite stabilizers, we compute the additive invariants of [X/G] using solely the subgroups of roots of unity of G. As an application, we establish a Lefschtez-Riemann-Roch formula for the computation of the additive invariants of proper push-forwards.
Cite
@article{arxiv.1806.06846,
title = {Motivic concentration theorem},
author = {Goncalo Tabuada and Michel Van den Bergh},
journal= {arXiv preprint arXiv:1806.06846},
year = {2018}
}
Comments
16 pages