# Difference between revisions of "Colloquia/Fall18"

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|January 29 (Monday) | |January 29 (Monday) | ||

| [http://www.math.columbia.edu/~chaoli/ Li Chao] (Columbia) | | [http://www.math.columbia.edu/~chaoli/ Li Chao] (Columbia) | ||

− | |[[# | + | |[[#Li Chao| Elliptic curves and Goldfeld's conjecture ]] |

| Jordan Ellenberg | | Jordan Ellenberg | ||

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== Spring Abstracts == | == Spring Abstracts == | ||

− | + | ===Li Chao=== | |

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+ | January 29: Li Chao (Columbia) | ||

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+ | Title: Elliptic curves and Goldfeld's conjecture | ||

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+ | Abstract: | ||

+ | An elliptic curve is a plane curve defined by a cubic equation. Determining whether such an equation has infinitely many rational solutions has been a central problem in number theory for centuries, which lead to the celebrated conjecture of Birch and Swinnerton-Dyer. Within a family of elliptic curves (such as the Mordell curve family y^2=x^3-d), a conjecture of Goldfeld further predicts that there should be infinitely many rational solutions exactly half of the time. We will start with a history of this problem, discuss our recent work (with D. Kriz) towards Goldfeld's conjecture and illustrate the key ideas and ingredients behind these new progresses. | ||

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== Past Colloquia == | == Past Colloquia == |

## Revision as of 10:07, 24 January 2018

## Contents

# Mathematics Colloquium

All colloquia are on Fridays at 4:00 pm in Van Vleck B239, **unless otherwise indicated**.

## Spring 2018

date | speaker | title | host(s) | |
---|---|---|---|---|

January 29 (Monday) | Li Chao (Columbia) | Elliptic curves and Goldfeld's conjecture | Jordan Ellenberg | |

February 2 | Thomas Fai (Harvard) | TBA | Spagnolie, Smith | |

February 9 | Wes Pegden (CMU) | TBA | Roch | |

March 16 | Anne Gelb (Dartmouth) | TBA | WIMAW | |

April 4 (Wednesday) | John Baez (UC Riverside) | TBA | Craciun | |

April 6 | Reserved | TBA | Melanie | |

April 13 | Jill Pipher (Brown) | TBA | WIMAW | |

April 25 (Wednesday) | Hitoshi Ishii (Waseda University) Wasow lecture | TBA | Tran | |

date | person (institution) | TBA | hosting faculty | |

date | person (institution) | TBA | hosting faculty | |

date | person (institution) | TBA | hosting faculty | |

date | person (institution) | TBA | hosting faculty | |

date | person (institution) | TBA | hosting faculty | |

date | person (institution) | TBA | hosting faculty | |

date | person (institution) | TBA | hosting faculty | |

date | person (institution) | TBA | hosting faculty | |

date | person (institution) | TBA | hosting faculty |

## Spring Abstracts

### Li Chao

January 29: Li Chao (Columbia)

Title: Elliptic curves and Goldfeld's conjecture

Abstract: An elliptic curve is a plane curve defined by a cubic equation. Determining whether such an equation has infinitely many rational solutions has been a central problem in number theory for centuries, which lead to the celebrated conjecture of Birch and Swinnerton-Dyer. Within a family of elliptic curves (such as the Mordell curve family y^2=x^3-d), a conjecture of Goldfeld further predicts that there should be infinitely many rational solutions exactly half of the time. We will start with a history of this problem, discuss our recent work (with D. Kriz) towards Goldfeld's conjecture and illustrate the key ideas and ingredients behind these new progresses.