Linking of Lagrangian Tori and Embedding Obstructions in Symplectic 4-Manifolds

Abstract

We classify weakly exact, rational Lagrangian tori in T* T2- 0T2 up to Hamiltonian isotopy. This result is related to the classification theory of closed 1-forms on Tn and also has applications to symplectic topology. As a first corollary, we strengthen a result due independently to Eliashberg-Polterovich and to Giroux describing Lagrangian tori in T* T2-0T2 which are homologous to the zero section. As a second corollary, we exhibit pairs of disjoint totally real tori K1, K2 ⊂ T*T2, each of which is isotopic through totally real tori to the zero section, but such that the union K1 K2 is not even smoothly isotopic to a Lagrangian. In the second part of the paper, we study linking of Lagrangian tori in (R4, ω) and in rational symplectic 4-manifolds. We prove that the linking properties of such tori are determined by purely algebro-topological data, which can often be deduced from enumerative disk counts in the monotone case. We also use this result to describe certain Lagrangian embedding obstructions.