Persistence of unknottedness of clean Lagrangian intersections
Abstract
Let Q0 and Q1 be two Lagrangian spheres in a 6-dimensional symplectic manifold. Assume that Q0 and Q1 intersect cleanly along a circle that is unknotted in both Q0 and Q1. We prove that there is no nearby Hamiltonian isotopy of Q0 and Q1 to a pair of Lagrangian spheres meeting cleanly along a circle that is knotted in either component, answering a question of Smith. The proof is based on a classification of the spherical summands in the prime decomposition of an exact Lagrangian in the Stein neighborhood of the union Q0 Q1 and the deep result that lens space rational Dehn surgeries characterize the unknot.
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