The Hormander and Maslov Classes and Fomenko's Conjecture
Abstract
Some functorial properties are studied for the H\"ormander classes defined for symplectic bundles. The behaviour of the Chern first form on a Lagrangian submanifold in an almost Hermitian manifold is also studied, and Fomenko's conjecture about the behaviour of a Maslov class on minimal Lagrangian submanifolds is considered.
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