Lagrangian submanifolds of the complex quadric as Gauss maps of hypersurfaces of spheres

Abstract

The Gauss map of a hypersurface of a unit sphere Sn+1(1) is a Lagrangian immersion into the complex quadric Qn and, conversely, every Lagrangian submanifold of Qn is locally the image under the Gauss map of several hypersurfaces of Sn+1(1). In this paper, we give explicit constructions for these correspondences and we prove a relation between the principal curvatures of a hypersurface of Sn+1(1) and the local angle functions of the corresponding Lagrangian submanifold of Qn. The existence of such a relation is remarkable since the definition of the angle functions depends on the choice of an almost product structure on Qn and since several hypersurfaces of Sn+1(1), with different principal curvatures, correspond to the same Lagrangian submanifold of Qn.