The Painlevé Property for Partial Differential Equations.
II. Bäcklund transformation, Lax pairs, and the Schwarzian derivative

John Weiss
La Jolla Institute, P. O. Box 1434, La Jolla, California 92038, USA
Institute of Pure and Applied Science, University of California
San Diego, La Jolla, California 92093, USA

Abstract:

In this paper we investigate the Painlevé property for partial differential equations. By application to several well-known partial differential equations (Burgers, KdV, MKdV, Bousinesq, higher-order KdV and KP equations) it is shown that consideration of the "singular manifold" leads to a formulation of these equations in terms of the "Schwarzian derivative". This formulation is invariant under the Moebius group (acting on dependent variables) and is shown to obtain the appropriate Lax pair (linearization) for the underlying nonlinear pde.

PACS numbers: 02.30.Jr