时间:2026年4月29日(星期三)15:00-16:00
地点:西湖大学云谷校区E14-212
主讲人:Evelina Viada, University of Göttingen
报告题目:Bogomolov and Lehmer type bounds and rational points of small rank on algebraic varieties
报告摘要:The Torsion Anomalous Conjecture (=TAC) gives a general framework of which the Manin-Mumford and the Mordell-Lang become special cases.
In spite remaining open in its generality, the TAC is proven is some cases in an effective way, implying cases of the effective Mordell-Lang Conjecture. I will explain the results obtained in joint works in this context. In particular I would like to give an overview of a recent joint work with Riccardo Pengo that allows us to give an explicit method to determine the rational points of any algebraic variety $V$ that is not a translate of a subgroup and it is embedded in $E^N$, where $E$ is an elliptic curve of rank one. The use of Bogomolov and Lehmer type bounds is central, as well as the arithmetic B\'ezout theorem and diophantine approximation.
