トーリック多様体の双対欠損の組合せ論的記述に関する研究

• Project/Area Number: 17K14162
• Research Category: Grant-in-Aid for Young Scientists (B)
• Allocation Type: Multi-year Fund
• Research Field: Algebra
• Research Institution: Okayama University (2021-2022); Nagoya University (2017-2020)
• Principal Investigator: 伊藤 敦 岡山大学, 自然科学学域, 准教授 (90712240)
• Project Period (FY): 2017-04-01 – 2024-03-31
• Project Status: Granted (Fiscal Year 2022)
• Budget Amount: ¥3,250,000 (Direct Cost: ¥2,500,000、Indirect Cost: ¥750,000); Fiscal Year 2020: ¥780,000 (Direct Cost: ¥600,000、Indirect Cost: ¥180,000); Fiscal Year 2019: ¥780,000 (Direct Cost: ¥600,000、Indirect Cost: ¥180,000); Fiscal Year 2018: ¥650,000 (Direct Cost: ¥500,000、Indirect Cost: ¥150,000); Fiscal Year 2017: ¥1,040,000 (Direct Cost: ¥800,000、Indirect Cost: ¥240,000)
• Keywords: トーリック多様体 / セシャドリ定数 / カラビ-ヤウ多様体 / アーベル多様体 / シジジー / 双対欠損 / K安定性 / 代数ビジョン

Outline of Annual Research Achievements

トーリック多様体の双対欠損について，ケーリー構造やトーリック多様体とは限らない一般の代数多様体の双対欠損の性質などの観点から研究を行ったが，特に進展は得られなかった．一方その過程で，以前Ambro氏（IMRA）との共同研究で示した，セシャドリ定数という不変量に関する不等式の証明に誤りを発見した．Ambro氏と共同で修正を行い，一部の結果は弱くなってしまったが，一部の結果は別証を与えることでより良い不等式が得られた．
その他以下のような研究も行った．
射影代数多様体の分類などにおいて双有理幾何学は非常に有力である．代数多様体Xに対し，そのQ分解的正規射影代数多様体と呼ばれる，Xと「ほとんど同型」（つまり余次元2以上のザリスキ閉集合をのぞいて同型）な代数多様体は双有理幾何学において重要な役割を果たす．
当該年度は，Ching-Jui Lai氏（国立成功大学）, Sz-Sheng Wang氏（Academia Sinica）との共同研究で，いくつかの3次元カラビ-ヤウ多様体の双有理幾何を研究し，それらのQ分解的正規射影代数多様体をすべて求めた．特にこれらのカラビ-ヤウ多様体に対しては，movable cone予想という，代数多様体上の直線束（の数値的同値類）がなす錘に関する予想が成り立つことを確認した．
代数多様体の射影空間への埋め込みが与えられた時，その定義多項式の間の関係式やその関係式の間の関係式等はシジジーと呼ばれる．「p番目までのシジジーが単純になる」とき，その埋め込みは条件(N_p)を満たすという．一般にこの条件が満たされるかどうかを確認するのは容易でないことが多いが，アーベル多様体の場合には，basepoint-freeness thresholdという不変量が小さいならば条件(N_p)が満たされることが，Pareschi氏，Jiang氏，Caucci氏らにより示されている．当該年度は，アーベル多様体上の射影束の普遍直線束が定める埋め込みの場合にその結果を一般化した．

Current Status of Research Progress

4: Progress in research has been delayed.

Reason

正標数における双対欠損の良い記述が見つかっていないため．

Strategy for Future Research Activity

複素数体上においては，トロピカル幾何を用いたトーリック多様体の双対欠損の記述が知られているので，正標数の場合にトロピカル幾何の観点から研究する．

Research Products

• [Int'l Joint Research] IMAR(ルーマニア)
• [Int'l Joint Research] IMAR(ルーマニア)
• [Journal Article] Corrigendum to “Successive minima of line bundles” [Adv. Math. 365 (2020) 107045] (2023)
  • Author(s): Ambro Florin, Ito Atsushi
  • Journal Title: Advances in Mathematics Volume: 420 Pages: 108966-108966
  • DOI: 10.1016/j.aim.2023.108966
  • Peer Reviewed / Int'l Joint Research
• [Journal Article] Examples on Loewy filtrations and K-stability of Fano varieties with non-reductive automorphism groups (2021)
  • Author(s): Ito Atsushi
  • Journal Title: Annales de l'Institut Fourier Volume: 71 Issue: 2 Pages: 515-537
  • DOI: 10.5802/aif.3395
  • Peer Reviewed / Open Access
• [Journal Article] Derived equivalence and Grothendieck ring of varieties: the case of K3 surfaces of degree 12 and abelian varieties (2020)
  • Author(s): Ito Atsushi、Miura Makoto、Okawa Shinnosuke、Ueda Kazushi
  • Journal Title: Selecta Mathematica Volume: 26 Issue: 3 Pages: 1-27
  • DOI: 10.1007/s00029-020-00561-x
  • Peer Reviewed
• [Journal Article] A Combinatorial Description of Dual Defects of Toric Varieties (2020)
  • Author(s): Furukawa Katsuhisa、Ito Atsushi
  • Journal Title: Communications in Contemporary Mathematics Volume: － Issue: 01 Pages: 2050001-2050001
  • DOI: 10.1142/s0219199720500017
  • Peer Reviewed
• [Journal Article] Successive minima of line bundles (2020)
  • Author(s): Ambro Florin、Ito Atsushi
  • Journal Title: Advances in Mathematics Volume: 365 Pages: 107045-107045
  • DOI: 10.1016/j.aim.2020.107045
  • Peer Reviewed / Int'l Joint Research
• [Journal Article] Projective Reconstruction in Algebraic Vision (2019)
  • Author(s): Ito Atsushi、Miura Makoto、Ueda Kazushi
  • Journal Title: Canadian Mathematical Bulletin Volume: － Issue: 3 Pages: 1-18
  • DOI: 10.4153/s0008439519000687
  • Peer Reviewed / Int'l Joint Research
• [Journal Article] A remark on higher syzygies on abelian surfaces (2018)
  • Author(s): Ito Atsushi
  • Journal Title: Communications in Algebra Volume: 46 Issue: 12 Pages: 5342-5347
  • DOI: 10.1080/00927872.2018.1464172
  • Peer Reviewed
• [Presentation] Review of some recent results on linear systems on abelian varieties (2023)
  • Author(s): 伊藤 敦
  • Organizer: 第1回熱海代数幾何学研究集会
  • Invited
• [Presentation] Projective normality of general polarized abelian varieties (2023)
  • Author(s): 伊藤敦
  • Organizer: K3, Enriques Surfaces, and Related Topics
  • Invited
• [Presentation] Projective normality of general polarized abelian varieties (2022)
  • Author(s): 伊藤 敦
  • Organizer: 城崎代数幾何学シンポジウム 2022
  • Invited
• [Presentation] Linear systems on general polarized abelian varieties of type (1,...,1,d) (2021)
  • Author(s): 伊藤 敦
  • Organizer: 都の西北 代数幾何学シンポジウム 2021 「接束の正値性とその周辺」
  • Invited
• [Presentation] Linear systems on abelian varieties via M-regularity of Q-twisted sheaves (2021)
  • Author(s): 伊藤 敦
  • Organizer: 第66回 代数学シンポジウム
  • Invited
• [Presentation] Linear systems on abelian varieties (2021)
  • Author(s): 伊藤 敦
  • Organizer: 第16回代数・解析・幾何学セミナー
  • Invited
• [Presentation] On a generalization of Seshadri constant (2019)
  • Author(s): 伊藤 敦
  • Organizer: Toric geometry, degenerations and related topics
  • Invited
• [Presentation] On Loewy filtrations and K-stability of Fano varieties with non-reductive automorphism groups (2018)
  • Author(s): 伊藤 敦
  • Organizer: Differential, Algebraic and Topological Methods in Complex Algebraic Geometry
  • Int'l Joint Research / Invited
• [Presentation] On Loewy filtrations and K-stability of Fano varieties with non-reductive automorphism groups (2018)
  • Author(s): 伊藤 敦
  • Organizer: Algebraic Geometry in East Asia
  • Int'l Joint Research / Invited
• [Presentation] On Loewy filtrations and K-stability of Fano varieties with non-reductive automorphism groups (2018)
  • Author(s): 伊藤 敦
  • Organizer: Workshop on Birational Geometry and Related Topics
  • Int'l Joint Research / Invited
• [Presentation] On Grothendieck ring of varieties and derived equivalence (2018)
  • Author(s): 伊藤 敦
  • Organizer: The 11th Conference on Arithmetic and Algebraic Geometry
  • Int'l Joint Research / Invited
• [Presentation] A remark on higher syzygies on abelian surfaces (2018)
  • Author(s): 伊藤 敦
  • Organizer: Higher dimensional algebraic geometry
  • Int'l Joint Research / Invited
• [Presentation] On reconstruction problem in algebraic vision (2017)
  • Author(s): 伊藤 敦
  • Organizer: Classification and Moduli Theory of Algebraic Varieties
  • Int'l Joint Research / Invited
• [Presentation] On Grothendieck ring of varieties and derived equivalence (2017)
  • Author(s): 伊藤 敦
  • Organizer: Second Japanese-European Symposium on Symplectic Varieties and Moduli Spaces
  • Int'l Joint Research / Invited
• [Remarks] Atsushi Ito
  • URL: https://sites.google.com/site/atsushiito221/
• [Remarks] Atsushi Ito
  • URL: https://sites.google.com/site/atsushiito221/home