Unified approach to miura, bäcklund and darboux transformations for nonlinear partial differential equations

Abstract

This paper is an attempt to present and discuss at some length the Singular Manifold Method. This Method is based upon the Painlevé Property systematically used as a tool for obtaining clear cut answers to almost all the questions related with Nonlinear Partial Differential Equations: Lax pairs, Miura, Bäcklund or Darboux Transformations as well as τ-functions, in a unified way. Besides to present the basics of the Method we exemplify this approach by applying it to four equations in (1 + 1)-dimensions. Two of them are related with the other two through Miura transformations that are also derived by using the Singular Manifold Method. Copyright © 1998 by the Authors.