Legendrian non-isotopic unit conormal bundles in high dimensions

Abstract

For any compact connected submanifold K of Rn, let K denote its unit conormal bundle, which is a Legendrian submanifold of the unit cotangent bundle of Rn. In this paper, we give examples of pairs (K0,K1) of compact connected submanifolds of Rn such that K0 is not Legendrian isotopic to K1, although they cannot be distinguished by classical invariants. Here, K1 is the image of an embedding f K0 Rn which is regular homotopic to the inclusion map of K0 and the codimension in Rn is greater than or equal to 4. As non-classical invariants, we define the strip Legendrian contact homology and a coproduct on it under certain conditions on Legendrian submanifolds. Then, we give a purely topological description of these invariants for K when the codimension of K is greater than or equal to 4. The main examples K0 and K1 are distinguished by the coproduct, which is computed by using an idea of string topology.

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