On the Leray-Maslov quantization of Lagrangian submanifolds

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

Using Malliavin's calculus, the divergence, the covariant derivative, and the Riemann and Ricci curvatures of a submanifold of the Wiener space are defined. It is shown that the Ricci and Riemann curvatures appear in the commutator of the divergence operator and covariant derivative operator. Capaci

Assume that a submanifold M C Rn of an arbitrary codimension k E { 1,. . . , n} is closed in some open set 0 C IR". With a given function ZL E C2(0 \ M) we may associate its trivial extension ii : 0 + IR such that tIlo\~ = u and ~I M 0 . The jump of the Laplacian of the function ZL on the submanifol