Topological constraints on clean Lagrangian intersections via microlocal sheaf theory

Abstract

Fix a knot K0 in R3 and consider a Lagrangian submanifold L of T*R3 that is isotopic to the conormal bundle of K0 by a compactly supported Hamiltonian isotopy and intersects the zero section R3 cleanly along a knot. In this paper, using microlocal sheaf theory and some results in 3-manifold theory, we prove that the knot type of K1 := L R3 in R3 is strictly constrained from the knot type of K0. Specifically, we deduce the existence of a surjective group homomorphism π1(R3 K0) π1(R3 K1) preserving the longitude and meridian with respect to the Seifert framing. Moreover, combining with a previous work by the second author, we obtain a rigidity result which was only known for the unknot: If K0 is the (2,q)-torus knot or the figure-eight knot, K1 must have the same knot type as K0.

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