Sutured contact homology, conormal stops and hyperbolic knots

Abstract

We apply the conormal construction to a hyperbolic knot K ⊂ S3, and study the sutured contact manifold (V, ) obtained by taking the complement of a standard neighbourhood of the unit conormal K ⊂ (ST*S3, st). We show that the sutured Legendrian contact homology of a unit fiber 0, with its product structure, is a complete invariant of the knot (up to mirror). This can also be seen as the computation of the homology of the fiber in ST* S3, stopped at K. Our main tool is, for any submanifold N ⊂ M, an explicit relationship between the complement of a unit conormal N, and the unit bundle of M N.