The Chazy XII Equation and Schwarz Triangle Functions

TL;DR

This paper explores the geometric and analytical solutions of the Chazy XII equation, linking it to Schwarz triangle functions, Darboux-Halphen systems, and hypergeometric transformations, with specific parameter conditions.

Contribution

It establishes a novel connection between Chazy XII solutions and Schwarz triangle functions via Darboux-Halphen systems, detailing parameter conditions and algebraic transformations.

Findings

Chazy XII solutions can be expressed using Schwarz triangle functions.

Solutions relate to Darboux-Halphen systems for specific parameters.

The paper derives rational maps from hypergeometric function transformations.

Abstract

Dubrovin [Lecture Notes in Math., Vol. 1620, Springer, Berlin, 1996, 120-348] showed that the Chazy XII equation $y'''- 2yy''+3y'^2 = K(6y'-y^2)^2$, $K \in \mathbb{C}$, is equivalent to a projective-invariant equation for an affine connection on a one-dimensional complex manifold with projective structure. By exploiting this geometric connection it is shown that the Chazy XII solution, for certain values of $K$, can be expressed as $y=a_1w_1+a_2w_2+a_3w_3$ where $w_i$ solve the generalized Darboux-Halphen system. This relationship holds only for certain values of the coefficients $(a_1,a_2,a_3)$ and the Darboux-Halphen parameters $(\alpha, \beta, \gamma)$, which are enumerated in Table 2. Consequently, the Chazy XII solution $y(z)$ is parametrized by a particular class of Schwarz triangle functions $S(\alpha, \beta, \gamma; z)$ which are used to represent the solutions $w_i$ of the Darboux-Halphen system. The paper only considers the case where $\alpha+\beta+\gamma<1$. The associated triangle functions are related among themselves via rational maps that are derived from the classical algebraic transformations of hypergeometric functions. The Chazy XII equation is also shown to be equivalent to a Ramanujan-type differential system for a triple $(\hat{P}, \hat{Q},\hat{R})$.