On special submanifolds in symplectic geometry

We study properties of hypersurfaces of the standard symplectic space (R 2n , ω), which are invariant under affine symplectic transformations. In this framework, we describe the invariants of hypersurfaces and discuss the existence of an isoperimetric inequality.  2002 Published by Elsevier Science

Degenerate submanifolds of Semi-Riemannian manifolds are studied. The relation of the Semi-Riemannian structure of a Semi-Riemannian manifold M to the intrinsic singular Semi-Riemannian structure of a degenerate submanifold H in M is investigated. Gauss-Codazzi equations are obtained for a certain c

We show that the space of compact lagrangian submanifolds of a symplectic 4-manifold is a coisotropic submanifold of the space of all codimension two submanifolds, the latter being equipped with a natural symplectic structure. The characteristic foliation of this coisotropic submanifold is shown to

Let L/k be a finite field extension and let (V, B) be a finite dimensional symplectic space over L. We examine the action of the symplectic group SPL(V) on the set of B'-isotropic ksubspaces of V, where B' = ~p o B is the k-symplectic form induced by a 'trace' map tp: L --, k. The orbits are complet