Symplectic aspects of the tt∗-Toda equations

Ryosuke Odoi

doi:10.1088/1751-8121/ac59ff

Symplectic aspects of the tt^∗-Toda equations

Ryosuke Odoi^*

^*この研究の対応する著者

基幹理工学部

研究成果: Article › 査読

抄録

We evaluate explicitly, in terms of the asymptotic data, the ratio of the constant pre-factors in the large and small x asymptotics of the tau functions for global solutions of the tt∗-Toda equations. This constant problem for the sinh-Gordon equation, which is the case n = 1 of the tt∗-Toda equations, was solved by Tracy (1991 Commun. Math. Phys. 142 297-311). We also introduce natural symplectic structures on the space of asymptotic data and on the space of monodromy data for a wider class of solutions, and show that these symplectic structures are preserved by the Riemann-Hilbert correspondence.

本文言語	English
論文番号	165201
ジャーナル	Journal of Physics A: Mathematical and Theoretical
巻	55
号	16
DOI	https://doi.org/10.1088/1751-8121/ac59ff
出版ステータス	Published - 2022 4月 22

ASJC Scopus subject areas

統計物理学および非線形物理学
統計学および確率
モデリングとシミュレーション
数理物理学
物理学および天文学（全般）

文献へのアクセス

10.1088/1751-8121/ac59ff

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引用スタイル

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abstract = "We evaluate explicitly, in terms of the asymptotic data, the ratio of the constant pre-factors in the large and small x asymptotics of the tau functions for global solutions of the tt∗-Toda equations. This constant problem for the sinh-Gordon equation, which is the case n = 1 of the tt∗-Toda equations, was solved by Tracy (1991 Commun. Math. Phys. 142 297-311). We also introduce natural symplectic structures on the space of asymptotic data and on the space of monodromy data for a wider class of solutions, and show that these symplectic structures are preserved by the Riemann-Hilbert correspondence. ",

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note = "Funding Information: This work is part of the author{\textquoteright}s PhD thesis at Waseda University. He would like to acknowledge his supervisor, Professor Martin Guest for his support throughout this work and his guidance in this field. He would like to acknowledge Professor Alexander Its for his friendly advice and his suggestions regarding the constant problem. He is also glad to acknowledge the financial support from the mathematics and physics unit {\textquoteleft}multiscale analysis, modelling and simulation{\textquoteright}, top global university project, Waseda University. Publisher Copyright: {\textcopyright} 2022 IOP Publishing Ltd.",

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N2 - We evaluate explicitly, in terms of the asymptotic data, the ratio of the constant pre-factors in the large and small x asymptotics of the tau functions for global solutions of the tt∗-Toda equations. This constant problem for the sinh-Gordon equation, which is the case n = 1 of the tt∗-Toda equations, was solved by Tracy (1991 Commun. Math. Phys. 142 297-311). We also introduce natural symplectic structures on the space of asymptotic data and on the space of monodromy data for a wider class of solutions, and show that these symplectic structures are preserved by the Riemann-Hilbert correspondence.

AB - We evaluate explicitly, in terms of the asymptotic data, the ratio of the constant pre-factors in the large and small x asymptotics of the tau functions for global solutions of the tt∗-Toda equations. This constant problem for the sinh-Gordon equation, which is the case n = 1 of the tt∗-Toda equations, was solved by Tracy (1991 Commun. Math. Phys. 142 297-311). We also introduce natural symplectic structures on the space of asymptotic data and on the space of monodromy data for a wider class of solutions, and show that these symplectic structures are preserved by the Riemann-Hilbert correspondence.

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