Perverse Sheaves and Knot Contact Homology

Abstract

In this paper, which is mostly a research announcement, we give a new algebraic construction of knot contact homology in the sense of L. Ng [Ng05a]. For a link L in R3 , we define a differential graded (DG) k-category A with finitely many objects, whose quasi-equivalence class is a topological invariant of L . In the case when L is a knot, the endomorphism algebra of a distinguished object of A coincides with the fully noncommutative knot DGA as defined by Ekholm, Etnyre, Ng and Sullivan in [EENS13a]. The input of our construction is a natural action of the braid group Bn on the category of perverse sheaves on a two-dimensional disk with singularities at n marked points, studied by Gelfand, MacPherson and Vilonen in [GMV96]. As an application, we show that the category of finite-dimensional representations of the link k-category A = H0( A) defined as the 0th homology of our DG category A is equivalent to the category of perverse sheaves on R3 which are singular along the link L . We also obtain several generalizations of the category A by extending the Gelfand-MacPherson-Vilonen braid action.