A class of quasilinear second order partial differential equations which describe spherical or pseudospherical surfaces

Abstract

Second order partial differential equations which describe spherical surfaces (ss) or pseudospherical surfaces (pss) are considered. These equations are equivalent to the structure equations of a metric with Gaussian curvature K=1 or K=−1, respectively, and they can be seen as the compatibility condition of an associated su(2)-valued or sl(2,R)-valued linear problem, also referred to as a zero curvature representation. Under certain assumptions we give a complete and explicit classification of equations of the form ztt=A(z,zx,zt)zxx+B(z,zx,zt)zxt+C(z,zx,zt) describing pss or ss, in terms of some arbitrary differentiable functions. Several examples of such equations are provided by choosing the arbitrary functions. In particular, well known equations which describe pseudospherical surfaces, such as the short-pulse and the constant astigmatism equations, as well as their generalizations and their spherical analogues are included in the paper.