On a Poincar\'e polynomial from Khovanov homology and Vassiliev invariants

Abstract

We introduce a Poincar\'e polynomial with two-variable t and x for knots, derived from Khovanov homology, where the specialization (t, x) = (1, -1) is a Vassiliev invariant of order n. Since for every n, there exist non-trivial knots with the same value of the Vassiliev invariant of order n as that of the unknot, there has been no explicit formulation of a perturbative knot invariant which is a coefficient of yn by the replacement q=ey for the quantum parameter q of a quantum knot invariant, and which distinguishes the above knots together with the unknot. The first formulation is our polynomial.