Green function, Painlevé VI equation, and Eisenstein series of weight one

Zhijie Chen*, Ting Jung Kuo, Chang Shou Lin, Chin Lung Wang

*此作品的通信作者

研究成果: 雜誌貢獻期刊論文同行評審

21 引文 斯高帕斯(Scopus)

摘要

The behavior and the location of singular points of a solution to Painlevé VI equation could encode important geometric properties. For example, Hitchin's formula indicates that singular points of algebraic solutions are exactly the zeros of Eisenstein series of weight one. In this paper, we study the problem: How many singular points of a solution λ(t) to the Painlevé VI equation with parameter ( 1/8 , -1/8 , 1/8 , 3/8 ) might have in C\{0, 1}? Here t0 ∈ C\{0, 1} is called a singular point of λ(t) if λ(t0) ∈ {0, 1, t0,∞}. Based on Hitchin's formula, we explore the connection of this problem with Green function and the Eisenstein series of weight one. Among other things, we prove: (i) There are only three solutions which have no singular points in C\{0, 1}. (ii) For a special type of solutions (called real solutions here), any branch of a solution has at most two singular points (in particular, at most one pole) in C \ {0, 1}. (iii) Any Riccati solution has singular points in C\{0, 1}. (iv) For each N ≥ 5 and N = 6, we calculate the number of the real j-values of zeros of the Eisenstein series EN1 (τ ; k1, k2) of weight one, where (k1, k2) runs over [0,N - 1]2 with gcd(k1, k2,N) = 1. The geometry of the critical points of the Green function on a flat torus Eτ, as τ varies in the moduli M1, plays a fundamental role in our analysis of the Painlevé VI equation. In particular, the conjectures raised in [23] on the shape of the domain Ω5 ⊂ M1, which consists of tori whose Green function has extra pair of critical points, are completely solved here.

原文英語
頁(從 - 到)185-241
頁數57
期刊Journal of Differential Geometry
108
發行號2
DOIs
出版狀態已發佈 - 2018 2月

ASJC Scopus subject areas

  • 分析
  • 代數與數理論
  • 幾何和拓撲

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