Theory of the universal Teichmüller space in harmonic analysis

2022 Fiscal Year Annual Research Report

• Project/Area Number: 21F20027
• Research Institution: Waseda University
• Principal Investigator: 松崎 克彦 早稲田大学, 教育・総合科学学術院, 教授 (80222298)
• Co-Investigator(Kenkyū-buntansha): WEI HUAYING 早稲田大学, 教育・総合科学学術院, 外国人特別研究員
• Project Period (FY): 2021-04-28 – 2023-03-31
• Keywords: 複素解析学

Outline of Annual Research Achievements

The theory of the universal Teichmueller space is highly active due to its close connections with other branches of mathematics. In our study, the Teichmueller spaces we investigate are obtained by incorporating a certain level of regularity from harmonic analysis into quasicircles. Specifically, we focus on Teichmueller spaces associated with chord-arc curves, asymptotically smooth curves, and Weil-Petersson curves. Chord-arc curves are a prominent subject of research in harmonic analysis, while asymptotically smooth curves and Weil-Petersson curves fall under the category of chord-arc curves. The study of Weil-Petersson curves is motivated by SLE theory. In our research, we have obtained the following results concerning the space of chord-arc curves:

(1) We examine the space of chord-arc curves on the plane that pass through infinity, with their parametrizations defined on the real line. We embed this space into the product of the BMO Teichmueller spaces. By developing the argument along this line, we are able to simplify a theorem by Coifman and Meyer, and we can provide a negative answer to a question raised by Katznelson-Nag-Sullivan.

(2) Utilizing chordal Loewner theory, we generalize the Ahlfors-Weill formula for quasiconformal extension and establish a version of this result for the half-plane, building upon Becker's work in the 1980s on the disk. As an application of this quasiconformal extension, we characterize an element of the VMO-Teichmueller space on the half-plane by employing the vanishing Carleson measure condition induced by the Schwarzian derivative.

Research Progress Status

令和4年度が最終年度であるため、記入しない。

Strategy for Future Research Activity

令和4年度が最終年度であるため、記入しない。

Research Products

• [Journal Article] BMO embeddings, chord-arc curves, and Riemann mapping parametrization (2023)
  • Author(s): Wei Huaying, Matsuzaki Katsuhiko
  • Journal Title: Advances in Mathematics Volume: 417 Pages: 108933
  • DOI: 10.1016/j.aim.2023.108933
  • Peer Reviewed / Int'l Joint Research
• [Journal Article] The p-Weil-Petersson Teichmueller space and the quasiconformal extension of curves (2022)
  • Author(s): Wei Huaying, Matsuzaki Katsuhiko
  • Journal Title: The Journal of Geometric Analysis Volume: 32 Pages: 213
  • DOI: 10.1007/s12220-022-00946-8
  • Peer Reviewed / Open Access / Int'l Joint Research
• [Journal Article] The VMO-Teichmueller space and the variant of Beurling-Ahlfors extension by heat kernel (2022)
  • Author(s): Wei Huaying, Matsuzaki Katsuhiko
  • Journal Title: Mathematische Zeitschrift Volume: 302 Pages: 1739～1760
  • DOI: 10.1007/s00209-022-03104-6
  • Peer Reviewed / Open Access / Int'l Joint Research
• [Journal Article] Space of chord-arc curves and BMO/VMO Teichmueller space (2022)
  • Author(s): Matsuzaki Katsuhiko, Wei Huaying
  • Journal Title: Annales Fennici Mathematici Volume: 48 Pages: 27～42
  • DOI: 10.54330/AFM.122367
  • Peer Reviewed / Open Access / Int'l Joint Research
• [Presentation] The p-integrable Teichmueller space and the variant of the Beurling-Ahlfors quasiconformal extension (2022)
  • Author(s): Katsuhiko Matsuzaki
  • Organizer: The POSTECH Conference 2022 on Complex Analytic Geometry (online)
• [Presentation] 擬等角拡張とその応用 (2022)
  • Author(s): 松崎克彦
  • Organizer: 函数論サマーセミナー
• [Presentation] Chordal Loewner chains and Teichmueller spaces on the half-plane (2022)
  • Author(s): 松崎克彦, WEI Huaying
  • Organizer: 日本数学会秋季総合分科会
• [Presentation] Chordal Loewner chains and Teichmueller spaces on the half-plane (2022)
  • Author(s): 松崎克彦, WEI Huaying
  • Organizer: 函数論シンポジウム