An obstruction to decomposable exact Lagrangian fillings

Abstract

We study some properties of decomposable exact Lagrangian cobordisms between Legendrian links in R3 with the standard contact structure. In particular, for any decomposable exact Lagrangian filling L of a Legendrian link K, we may obtain a normal ruling of K associated with L. We prove that the associated normal rulings must have even number of clasps. As a result, we give a particular Legendrian (4,-(2n+5))-torus knot, for each n ≥ 0, which does not have a decomposable exact Lagrangian filling because it has only 1 normal ruling and this normal ruling has odd number of clasps.