Heegner points, stark-Heegner points, and diagonal classes
This volume comprises four interrelated articles whose unifying theme is the study of Heegner and Stark-Heegner points, and their connections with the padic logarithm of certain global cohomology classes attached to a pair of weight one theta series of a common (imaginary or real) quadratic field. T...
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Auteurs principaux : | , , , , |
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Format : | Livre |
Langue : | anglais |
Titre complet : | Heegner points, stark-Heegner points, and diagonal classes / Massimo Bertolini, Henri Darmon, Victor Rotger, [et al.] |
Publié : |
Paris :
Société mathématique de France
, DL 2022 |
Description matérielle : | 1 vol. (xviii-201 p.) |
Collection : | Astérisque ; 434 |
Sujets : | |
Documents associés : | Fait partie de l'ensemble:
Astérisque |
Résumé : | This volume comprises four interrelated articles whose unifying theme is the study of Heegner and Stark-Heegner points, and their connections with the padic logarithm of certain global cohomology classes attached to a pair of weight one theta series of a common (imaginary or real) quadratic field. These global classes are obtained from p-adic deformations of diagonal classes attached to triples of modular forms of weight > 1, and naturally generalise a construction of Kato which one recovers when the two theta series are replaced by Eisenstein series of weight one. Understanding the extent to which such classes obtained via the p-adic interpolation of motivic cohomology classes are themselves motivic is a key motivation for this study. A second is the desire to show that Stark-Heegner points, whose global nature is still poorly understood theoretically, arise from classes in global Galois cohomology |
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Notes : | Résumé en anglais et en français Autres auteurs : Marco Adamo Seveso, Rodolfo Venerucci |
Historique des publications : | N° de : "Astérisque", ISSN 0303-1179, (2022)n°434 |
Bibliographie : | Références bibliographiques en fin d'articles |
ISBN : | 978-2-85629-959-3 |