Around the de Rham-Betti conjecture
| Autor: | Kreutz, Tobias, Shen, Mingmin, Vial, Charles |
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| Rok vydání: | 2022 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | A de Rham-Betti class on a smooth projective variety $X$ over an algebraic extension $K$ of the rational numbers is a rational class in the Betti cohomology of the analytification of$X$ that descends to a class in the algebraic de Rham cohomology of $X$ via the period comparison isomorphism. The period conjecture of Grothendieck implies that de Rham-Betti classes should be algebraic. We prove that any de Rham-Betti class on a product of elliptic curves is algebraic. This is achieved by showing that the Tannakian torsor associated to a de Rham-Betti object is connected, and by exploiting the analytic subgroup theorem of W\"ustholz. In the case of products of non-CM elliptic curves, we prove the stronger result that $\overline{\mathds{Q}}$-de Rham-Betti classes are $\overline \mathds{Q}$-linear combinations of algebraic classes by showing that the period comparison isomorphism generates the torsor of motivic periods. A key step consists in establishing a version of the analytic subgroup theorem with $\overline \mathds{Q}$-coefficients. Finally, building on results of Deligne and Andr\'e regarding the Kuga-Satake correspondence, we further show that any de Rham-Betti isometry between the second cohomology groups of hyper-K\"ahler varieties, with second Betti number not 3, is Hodge. As two applications we show that codimension-2 de Rham-Betti classes on hyper-K\"ahler varieties of known deformation type are Hodge and we obtain a global de Rham-Betti Torelli theorem for K3 surfaces over $\overline \mathds{Q}$. Comment: New title, new coauthor. Main changes: new results regarding $\overline \mathds{Q}$-de Rham-Betti classes and new results regarding de Rham-Betti classes on hyper-K\"ahler varieties |
| Databáze: | arXiv |
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