Quadratic Differential Systems and Chazy Equations, I

Abstract

Generalized Darboux-Halphen (gDH) systems, which form a versatile class of three-dimensional homogeneous quadratic differential systems (HQDS's), are introduced. They generalize the Darboux-Halphen (DH) systems considered by other authors, in that any non-DH gDH system is affinely but not projectively covariant. It is shown that the gDH class supports a rich collection of rational solution-preserving maps: morphisms that transform one gDH system to another. The proof relies on a bijection between (i) the solutions with noncoincident components of any `proper' gDH system, and (ii) the solutions of a generalized Schwarzian equation (gSE) associated to it, which generalizes the Schwarzian equation (SE) familiar from the conformal mapping of hyperbolic triangles. The gSE can be integrated parametrically in terms of the solutions of a Papperitz equation, which is a generalized Gauss hypergeometric equation. Ultimately, the rational gDH morphisms come from hypergeometric transformations. A complete classification of proper non-DH gDH systems with the Painleve property (PP) is also carried out, showing how some are related by rational morphisms. The classification follows from that of non-SE gSE's with the PP, due to Garnier and Carton-LeBrun. As examples, several non-DH gDH systems with the PP are integrated explicitly in terms of elementary and elliptic functions.