Second-order equations and local isometric immersions of pseudo-spherical surfaces

Abstract

We consider the class of differential equations that describe pseudo-spherical surfaces of the form u\t=F(u,u\x,u\xx) and u\xt=F(u, u\x) given in Chern-Tenenblat ChernTenenblat and Rabelo-Tenenblat RabeloTenenblat90. We answer the following question: Given a pseudo-spherical surface determined by a solution u of such an equation, do the coefficients of the second fundamental form of the local isometric immersion in R3 depend on a jet of finite order of u? We show that, except for the sine-Gordon equation, where the coefficients depend on a jet of order zero, for all other differential equations, whenever such an immersion exists, the coefficients are universal functions of x and t, independent of u.