Integral Artin motives : t-structures and Artin Vanishing Theorem
| Autor: | Ruimy, Raphaël |
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| Rok vydání: | 2022 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | In this text, we are mainly interested in the existence of t-structures on the category of Artin \'etale motives with integral coefficients. The latter is generated by motives of finite schemes over the base scheme. We first focus on smooth objects, which we link to \'etale local systems and then on the ordinary t-structure, the existence of which we prove. We also construct the perverse homotopy t-structure which is the best possible approximation to a perverse t-structure on Artin motives with rational coefficients. The heart of this t-structure has properties similar to those of the category of perverse sheaves and contains the Ayoub-Zucker motive. Finally, we construct a perverse motivic t-structure on Artin motives with integral coefficients when the base scheme is of dimension at most $2$ and show that this result falls short in dimension $4$. This construction relies notably on a an analogue for Artin motives of the Artin Vanishing Theorem. Comment: 153 pages, comments welcome |
| Databáze: | arXiv |
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