On families of Lagrangian submanifolds (Q1598149)

The stability of a compact Lagrangian submanifold of a symplectic manifold under the perturbation of the symplectic structure is studied. Let \(\left( X,\omega _{t}\right) \) be a symplectic manifold, \(L\subset X\) a compact Lagrangian submanifold, and \(\omega _{t}\) \(\left( t\in \left( -1,1\right) \right) \) a family of symplectic structures on \(X\) with \(\omega _{0}=\omega \). If \(X\) is compact and the \(\omega _{t}\) \(^{\prime }s\) are cohomologous, then it is proven that there exists a family \(\phi _{t}\) of diffeomorphisms of \(X\) with \(\phi _{0}=id_{X}\) and \(\omega _{t}=\phi _{t}^{\ast }\left( \omega _{0}\right) \). In addition, if \(L\subset X\) is a Lagrangian submanifold for \(\left( X,\omega _{0}\right) \), then it is shown that \(L_{t}=\phi _{t}^{-1}\left( L\right) \) is a Lagrangian submanifold for \(\left( X,\omega _{t}\right) \). When one assumes that \(L\) is compact and the restriction \(\left. \omega _{t}\right| _{L}\) is exact for every \(t\), then it is established that there exists a family \(L_{t}\) with the above property for sufficiently small \(t\). Similar results are proven for the stability of special Lagrangian and Bohr-Sommerfeld special Lagrangian submanifolds, under perturbation of the ambient Calabi-Yau structure.