Topological constraints on clean Lagrangian intersections from Q-valued augmentations

Abstract

Let K be a knot in R3 which has the (2,q)-torus knot for q≠ 1 or the figure-eight knot as a component of connected sum. For its conormal bundle LK in T*R3, we show that there is no compactly supported Hamiltonian diffeomorphism on T*R3 such that (LK) intersects the zero section R3 cleanly along the unknot in R3. Using symplectic field theory, the proof is reduced to studying the augmentation variety Vk(K) of K over a filed k. The key point of this paper is finding an algebraic constraint on Vk(K) which is valid only when k is not algebraically closed, and the proof is completed by some arithmetic argument with k=Q.