On a complexification of the moduli space of Bohr - Sommerfeld lagrangian cycles

Abstract

In the previous papers we present a construction of the set USBS in the direct product BS × P (M, L) of the moduli space of Bohr - Sommerfeld lagrangian submanifolds of fixed topological type and the projectivized space of smooth sections of the prequantization bundle L M over a given compact simply connected symplectic manifold M. Canonical projections p: USBS P (M, L) and q: USBS BS are studied in the present text: first, we show that the differential d p at a given point is an isomorphism, which implies that a natural complex structure can be defined on USBS; second, the projection q: USBS BS splits as the combination USBS T BS BS such that the fibers of the first map are complex subsets in USBS. This implies that an appropriate section of the first map should define a complex structure on T BS; therefore it can be seen as a complexification of the moduli space BS. The construction can be exploited in the Lagrangian approach to Geometric Quantization