A characterization of Weingarten surfaces in hyperbolic 3-space

Abstract

We study 2-dimensional submanifolds of the space L(H3) of oriented geodesics of hyperbolic 3-space, endowed with the canonical neutral K\"ahler structure. Such a surface is Lagrangian iff there exists a surface in H3 orthogonal to the geodesics of . We prove that the induced metric on a Lagrangian surface in L(H3) has zero Gauss curvature iff the orthogonal surfaces in H3 are Weingarten: the eigenvalues of the second fundamental form are functionally related. We then classify the totally null surfaces in L(H3) and recover the well-known holomorphic constructions of flat and CMC 1 surfaces in H3.