Rational Symplectic Field Theory over Z2 for exact Lagrangian cobordisms

Abstract

We construct a version of rational Symplectic Field Theory for pairs (X,L), where X is an exact symplectic manifold, where L⊂ X is an exact Lagrangian submanifold with components subdivided into k subsets, and where both X and L have cylindrical ends. The theory associates to (X,L) a -graded chain complex of vector spaces over 2, filtered with k filtration levels. The corresponding k-level spectral sequence is invariant under deformations of (X,L) and has the following property: if (X,L) is obtained by joining a negative end of a pair (X',L') to a positive end of a pair (X'',L''), then there are natural morphisms from the spectral sequences of (X',L') and of (X'',L'') to the spectral sequence of (X,L). As an application, we show that if ⊂ Y is a Legendrian submanifold of a contact manifold then the spectral sequences associated to (Y×,ks×), where Y× is the symplectization of Y and where ks⊂ Y is the Legendrian submanifold consisting of s parallel copies of subdivided into k subsets, give Legendrian isotopy invariants of .

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