Toward a topological description of Legendrian contact homology of unit conormal bundles
Abstract
For a smooth compact submanifold K of a Riemannian manifold Q, its unit conormal bundle K is a Legendrian submanifold of the unit cotangent bundle of Q with a canonical contact structure. Using pseudo-holomorphic curve techniques, the Legendrian contact homology of K is defined when, for instance, Q=Rn. In this paper, aiming at giving another description of this homology, we define a graded R-algebra for any pair (Q,K) with orientations from a perspective of string topology and prove its invariance under smooth isotopies of K. The author conjectures that it is isomorphic to the Legendrian contact homology of K with coefficients in R in all degrees. This is a reformulation of a homology group, called string homology, introduced by Cieliebak, Ekholm, Latschev and Ng when the codimension of K is 2, though the coefficient is reduced from original Z[π1(K)] to R. We compute our invariant (i) in all degrees for specific examples, and (ii) in the 0-th degree when the normal bundle of K is a trivial 2-plane bundle.
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