2-dimensional symplectic linearization (Q2732637)

Given a symplectic manifold with a Lagrangian foliation \({\mathcal L}\), and assuming one of its leafs \(L_0\) is compact, it is known that \(L_0\) is equipped with a flat, affine connection \(\nabla_0\). This in turn gives rise to a Lagrangian foliation \({\mathcal L}_0\) on \(T^*L_0\), which is called the symplectic linearisation of \({\mathcal L}\) in the neighbourhood of \(L_0\). On a 2-torus \(T^2\), there are two (non-trivial) flat affine structures which are complete, an `integer' and an `irrational' one. For the case that \(L_0=T^2\) and has linearisable holonomy, the author gives a classification of the problem of symplectic linearisation.