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Talks & Presentations

Talks

  1. 2025-11: Homotopy theory of dg categories and formal category theoretic methods,
    Math Colloquium in Kyoto University, Kyoto University. (invited) [slide]
  2. 2025-08: Overview of “Categorical resolution of irrational singularities” (by A. Kuznetsov and V. Lunts),
    Mini-Workshop on Derived Categories in Algebraic Geometry, Hokkaido University. (invited) [slide (in Japanese)]
  3. 2025-05: A formal category theoretic approach to the homotopy theory of dg categories II,
    OCAMI Ring Theory Seminar, Osaka Metropolitan University. (invited) [slide]
  4. 2025-05: A formal category theoretic approach to the homotopy theory of dg categories,
    Sugimoto Algebra Seminar, Osaka Metropolitan University. (invited) [slide]
  5. 2025-03: A formal category theoretic approach to the homotopy theory of dg categories,
    The 29th Conference on Algebra for Young Researchers, Osaka University. [slide]
  6. 2025-03: A formal category theoretic approach to the homotopy theory of dg categories,
    The 21st Mathematics Conference for Young Researchers (MCYR21), Hokkaido University. [slide] [Tech Report (in Japanese)]
  7. 2025-02: A formal category theoretic approach to the homotopy theory of dg categories,
    Mathsci Freshman Seminar 2025, Nagoya University. [slide] [Proc (in Japanese)]
  8. 2024-09: A formal category theoretic approach to the homotopy theory of dg categories,
    MSJ Autumn Meeting 2024 at Osaka University, Osaka University. [slide]
  9. 2024-06: A formal category theoretic approach to the homotopy theory of dg categories,
    Osaka Algebraic Geometry Seminar, Osaka University. (invited) [slide]
  10. 2024-03: Category theory for the homotopy theory of dg categories,
    Computer Science and Category Theory 2024, Chiba University.
  11. 2022-07: Grothendieck enriched categories,
    Tokyo-Nagoya Algebra Seminar, Online. (invited)
  12. 2021-04: Grothendieck enriched categories,
    Osaka Online Algebraic Geometry Seminar, Online. (invited)

Poster Presentations

  1. 2023-03: dg圏のなすホモトピー圏が持つ高次構造について,
    Session "Young Mathematicians' Challenge" (4th) 2023, AP-Ichigaya, Tokyo.
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