Beijing International Center for Mathematical Research, Peking University
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Date
Time
Local Time
Room
Session
Role
Topic
2023-07-21
08:00-09:00
2023-07-21,08:00-09:00
LR9 (A6 1F)
07-21 Morning Math LR9 (A6 1F)
Speaker
Partial heights and the geometric Bombieri--Lang Conjecture
This is a joint work with Xinyi Yuan. Let $K=k(B)$ the function field a variety $B$ over a field $k$ of characteristic 0. Let $X$ be a projective variety over $K$. Assume that there is a finite morphism from $X$ to an abelian variety $A$ with trivial trace. We show that $X(K)$ is contained in the algebraic special subset. In particular, if further $X$ is of general type, then $X(K)$ is not Zariski dense.