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【学术报告】Homological mirror symmetry for chain type polynomials

  • 主讲人:Umut Varolgunes
  • 时间:周四12:00,2021-04-15
  • 地点:online

 

Beijing-Novosibirsk seminar on geometry and mathematical physics online seminar

摘要(Abstract) 

 I will start by explaining Takahashi's homological mirror symmetry (HMS) conjecture regarding invertible polynomials, which is an open string interpretation of Berglund-Hubsch-Henningson mirror symmetry. In joint work with A. Polishchuk, we resolve this HMS conjecture in the chain type case up to rigorous proofs of general statements about Fukaya-Seidel categories. Our proof goes by showing that the categories in both sides are obtained from the category Vect(k) by applying a recursion. I will explain this recursion categorically and sketch the argument for why it is satisfied on the A-side assuming the aforementioned foundational results. If time permits, I will also mention what goes into the proof in the B-side.

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