Isometric Embedding and Darboux Integrability

Abstract

Given a smooth 2-dimensional Riemannian or pseudo-Riemannian manifold (M, g) and an ambient 3-dimensional Riemannian or pseudo-Riemannian manifold (N, h), one can ask under what circumstances does the exterior differential system I for the isometric embedding M N have particularly nice solvability properties. In this paper we give a classification of all 2-metrics g whose local isometric embedding system into flat Riemannian or pseudo-Riemannian 3-manifolds (N, h) is Darboux integrable. As an illustration of the motivation behind the classification, we examine in detail one of the classified metrics, g0, showing how to use its Darboux integrability in order to construct all its embeddings in finite terms of arbitrary functions. Additionally, the geometric Cauchy problem for the embedding of g0 is shown to be reducible to a system of two first-order ODEs for two unknown functions---or equivalently, to a single second-order scalar ODE. For a large class of initial data, this reduction permits explicit solvability of the geometric Cauchy problem for g0 up to quadrature. The results described for g0 also hold for any classified metric whose embedding system is hyperbolic.