Characteristic cycle of a rank one sheaf and ramification theory-Reference-Cited by-同舟云学术

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Characteristic cycle of a rank one sheaf and ramification theory

Published:2020-03-09 Issue:3 Volume:29 Page:471-545
ISSN:1056-3911
Container-title:Journal of Algebraic Geometry
language:en
Short-container-title:J. Algebraic Geom.

Author:

Yatagawa Yuri

Abstract

We compute the characteristic cycle of a rank one sheaf on a smooth surface over a perfect field of positive characteristic. We construct a canonical lifting on the cotangent bundle of Kato’s logarithmic characteristic cycle using ramification theory and prove the equality of the characteristic cycle and the canonical lifting. As corollaries, we obtain a computation of the singular support in terms of ramification theory and the Milnor formula for the canonical lifting.

Publisher

American Mathematical Society (AMS)

Subject

Geometry and Topology,Algebra and Number Theory

Reference20 articles.

1. Ramification of local fields with imperfect residue fields;Abbes, Ahmed;Amer. J. Math.,2002

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3. Analyse micro-locale 𝑙-adique en caractéristique 𝑝>0: le cas d’un trait;Abbes, Ahmed;Publ. Res. Inst. Math. Sci.,2009

4. Ramification and cleanliness;Abbes, Ahmed;Tohoku Math. J. (2),2011

5. Constructible sheaves are holonomic;Beilinson, A.;Selecta Math. (N.S.),2016

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