1,262 research outputs found
Some remarks on the size of tubular neighborhoods in contact topology and fillability
The well-known tubular neighborhood theorem for contact submanifolds states
that a small enough neighborhood of such a submanifold N is uniquely determined
by the contact structure on N, and the conformal symplectic structure of the
normal bundle. In particular, if the submanifold N has trivial normal bundle
then its tubular neighborhood will be contactomorphic to a neighborhood of
Nx{0} in the model space NxR^{2k}.
In this article we make the observation that if (N,\xi_N) is a 3-dimensional
overtwisted submanifold with trivial normal bundle in (M,\xi), and if its model
neighborhood is sufficiently large, then (M,\xi) does not admit an exact
symplectic filling.Comment: 19 pages, 2 figures; added example of manifold that is not fillable
by neighborhood criterium; typo
Geometric Quantization of real polarizations via sheaves
In this article we develop tools to compute the Geometric Quantization of a
symplectic manifold with respect to a regular Lagrangian foliation via sheaf
cohomology and obtain important new applications in the case of real
polarizations. The starting point is the definition of representation spaces
due to Kostant. Besides the classical examples of Gelfand-Cetlin systems due to
Guillemin and Sternberg very few examples of explicit computations of real
polarizations are known. The computation of Geometric Quantization for
Gelfand-Cetlin systems is based on a theorem due to \'Sniatycki for fibrations
which identifies the representation space with the set of Bohr-Sommerfeld
leaves determined by the integral action coordinates.
In this article we check that the associated sheaf cohomology apparatus of
Geometric Quantization satisfies Mayer-Vietoris and K\"unneth formulae. As a
consequence, a new short proof of this classical result for fibrations due to
\'Sniatycki is obtained. We also compute Geometric Quantization with respect to
any generic regular Lagrangian foliation on a 2-torus and the case of the
irrational flow. In the way, we recover some classical results in the
computation of foliated cohomology of these polarizations.Comment: 35 pages, 4 figures, minor change
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