Conformal geometry of marginally trapped surfaces in S41

Abstract

A spacelike surface S⊂ S41 is marginally trapped if its mean curvature vector is lightlike. On any oriented spacelike surface S ⊂ S41 we show that a choice of orientation of the normal bundle (S) determines a smooth map G: S S3 which we call the null Gauss map of S. We show that if S is marginally trapped then G is a conformal immersion away the zeros of certain quadratic Hopf-differential of S and so the surface G(S) is uniquely determined up to conformal transformations of S3 by two invariants: the normal Hopf differential and the Schwartzian derivative s. We show that these invariants plus an additional quadratic differential δ are related by a differential equation and determine the geometry of S up to ambient isometries of S41. This allows us to obtain a characterization of marginally trapped surfaces S whose null Gauss image is a constrained Willmore surface in S3 in the sense of C.Bohle, G. Peters and U.Pinkall [arXiv:math/0411479]. As an application of these results we construct and study integrable non-trivial one-parameter deformations of marginally trapped surfaces with non-zero parallel mean curvature vector and those with flat normal bundle.