Association of multiple modular L-functions and polylogarithms

• Project/Area Number: 18K03260
• Research Category: Grant-in-Aid for Scientific Research (C)
• Allocation Type: Multi-year Fund
• Section: 一般
• Review Section: Basic Section 11010:Algebra-related
• Research Institution: Kindai University
• Principal Investigator: Ihara Kentaro 近畿大学, 理工学部, 准教授 (00467523)
• Project Period (FY): 2018-04-01 – 2023-03-31
• Project Status: Completed (Fiscal Year 2022)
• Budget Amount: ¥3,250,000 (Direct Cost: ¥2,500,000、Indirect Cost: ¥750,000); Fiscal Year 2022: ¥650,000 (Direct Cost: ¥500,000、Indirect Cost: ¥150,000); Fiscal Year 2021: ¥650,000 (Direct Cost: ¥500,000、Indirect Cost: ¥150,000); Fiscal Year 2020: ¥650,000 (Direct Cost: ¥500,000、Indirect Cost: ¥150,000); Fiscal Year 2019: ¥650,000 (Direct Cost: ¥500,000、Indirect Cost: ¥150,000); Fiscal Year 2018: ¥650,000 (Direct Cost: ¥500,000、Indirect Cost: ¥150,000)
• Keywords: multiple L function / multiple zeta values / elliptic modular form / harmonic product / Mellin transformation / Hurwitz zeta function / Dedekind zeta function / 保型L関数 / 多重ゼータ値 / アソシエーター

Outline of Final Research Achievements

One of the natural question on the period algebra associated to multiple automorphic L-values is whether the algebra is equipped with the harmonic product, including the connection with Rankin convolution. In collaboration with Dr. Nakamura of Kindai University and Dr. Yamamoto of Keio University, we obtained the Mellin integral representation of multiple zeta values. It turns out that the harmonic product originates from the product of its integrands. As a shuffle version of this research, in collaboration with Mr. Ishibashi of Kindai University, we obtained the Mellin integral representation of multiple Hurwitz polylogs. In addition, through research with Dr. Nakamura and others at Kinki University, we obtained the Ohno-Zagier type relations for multiple Hurwitz zeta values, and this result was published in a journal in 2022. As a recent result with Mr. Matsuda of Kindai University, we found a relationship between automorphic multiple L-values and Dedekind zeta values.

Academic Significance and Societal Importance of the Research Achievements

保型形式と呼ばれる関数に対して、周期という積分を用いて表示される特別な数が定まる。本研究では、従来の周期の多重化を考察した。様々な保型形式を考え、その多重化された周期の全体に備わる構造の研究を行った結果、保型形式以外の整数論に現れる種々のゼータ関数やL関数、またポリログ関数の多重化との関係をいくつか見つけることができた。例えば、保型形式にも関連するポリログ関数やフルヴィッツ型のポリログ関数のメリン型積分による表示を発見することができた。

Research Products

• [Journal Article] 多重フルヴィッツポリログの積分表示について (2022)
  • Author(s): 石橋大生-井原健太郎
  • Journal Title: 近畿大学理工学綜合研究所紀要 (Science and Technology) Volume: 33 Pages: 1-4
  • Open Access
• [Journal Article] Generating function of multiple polylog of Hurwitz type (2022)
  • Author(s): Ihara Kentaro, Kusunoki Yusuke, Nakamura Yayoi、Saeki Hitomi
  • Journal Title: Canadian Journal of Mathematics Volume: - Issue: 1 Pages: 1-17
  • DOI: 10.4153/s0008414x22000621
  • Peer Reviewed
• [Journal Article] 多重ポリログ関数のメリン積分表示 (2021)
  • Author(s): 石橋大生-井原健太郎
  • Journal Title: 近畿大学理工学綜合研究所紀要 (Science and Technology) Volume: 32 Pages: 1-4
  • NAID: 40022749091
  • Open Access
• [Journal Article] 秋山・谷川三角形の母関数 (2020)
  • Author(s): 井原健太郎-関谷大輔
  • Journal Title: 近畿大学理工学総合研究所紀要 (Science and Technology) Volume: 31 Pages: 1-3
  • NAID: 40022202396
  • Open Access
• [Journal Article] 秋山・谷川三角形の母関数 (2020)
  • Author(s): 井原健太郎-関谷大輔
  • Journal Title: 近畿大学理工学綜合研究所紀要 (Science and Technology) Volume: 31 Pages: 1-3
  • NAID: 40022202396
• [Journal Article] 秋山・谷川三角形の母関数 (2019)
  • Author(s): 井原健太郎 関谷大輔
  • Journal Title: 近畿大学理工学綜合研究所紀要 Volume: 印刷中
  • NAID: 40022202396
  • Open Access
• [Presentation] New expression of multiple zeta values via multiple Mellin transform (2021)
  • Author(s): 井原健太郎
  • Organizer: 名古屋ゼータ若手研究集会
  • Invited
• [Presentation] Iterated integral of elliptic cusp forms (2018)
  • Author(s): 井原健太郎
  • Organizer: 早稲田大学整数論セミナー
• [Presentation] ゼータ関数の多重化と整数論 (2018)
  • Author(s): 井原健太郎
  • Organizer: 近畿大学理工イノベーションフォーラム