The homotopy cardinality of the representation category for a Legendrian knot

Abstract

Given a Legendrian knot in (R3, (dz-ydx)) one can assign a combinatorial invariants called ruling polynomials. These invariants have been shown to recover not only a (normalized) count of augmentations but are also closely related to a categorical count of augmentations in the form of the homotopy cardinality of the augmentation category. In this article, we prove that that the homotopy cardinality of the n-dimensional representation category is a multiple of the n-colored ruling polynomial. Along the way, we establish that two n-dimensional representations are equivalent in the representation category if they are conjugate DGA homotopic. We also provide some applications to Lagrangian concordance.