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DATE | 2022-10-06 16:10-17:00 |

PLACE | 數學系館 1F3174教室 |

SPEAKER | 王姿月 研究員（中央研究院數學研究所） |

TITLE | On Generalized abc Conjecture over Function Fields |

ABSTRACT |
Let $\epsilon$ be a positive real number. The abc conjecture asserts that there is a constant $C(\epsilon)$ such that for any triple of coprime positive integers with $a+b=c$, the inequality $ c\le C(\epsilon) \prod_{p|(abc)}p^{1+\epsilon}$ holds.
In this talk, we will discuss this conjecture and its general version in the function field setting. In particular, we will formulate Vojta's general abc conjecture for 2-dimensional algebraic tori over function fields. This is a joint work with Ji Guo and Chia-Liang Sun |