EQUIVARIANT ZETA FUNCTIONS FOR INVARIANT NASH GERMS-Reference-Cited by-同舟云学术

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EQUIVARIANT ZETA FUNCTIONS FOR INVARIANT NASH GERMS

Published:2016-05-13 Issue:1 Volume:222 Page:100-136
ISSN:0027-7630
Container-title:Nagoya Mathematical Journal
language:en
Short-container-title:Nagoya Math. J.

Author:

PRIZIAC FABIEN

Abstract

To any Nash germ invariant under right composition with a linear action of a finite group, we associate its equivariant zeta functions, inspired from motivic zeta functions, using the equivariant virtual Poincaré series as a motivic measure. We show Denef–Loeser formulas for the equivariant zeta functions and prove that they are invariants for equivariant blow-Nash equivalence via equivariant blow-Nash isomorphisms. Equivariant blow-Nash equivalence between invariant Nash germs is defined as a generalization involving equivariant data of the blow-Nash equivalence.

Publisher

Cambridge University Press (CUP)

Subject

General Mathematics

Reference22 articles.

1. Patching local uniformizations

2. On blow-analytic equivalence;Fukui;Panor. Synthèses, Soc. Math. France,2007

3. Germs of arcs on singular algebraic varieties and motivic integration

4. [18] F. Priziac , Equivariant weight filtration for real algebraic varieties with action, J. Math. Soc. Japan (to appear).

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2. On Grothendieck rings and algebraically constructible functions;Mathematische Annalen;2017-06-26

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