More 1-cocycles for classical knots

Abstract

Let Mreg be the topological moduli space of long knots up to regular isotopy, and for any natural number n > 1 let Mregn be the moduli space of all n-cables of framed long knots which are twisted by a string link to a knot in the solid torus V3 . We upgrade the Vassiliev invariant v2 of a knot to an integer valued combinatorial 1-cocycle for Mregn by a very simple formula. This 1-cocycle depends on a natural number a ∈ Z H1(V3;Z) with 0<a<n as a parameter and we obtain a polynomial-valued 1-cocycle by taking the Lagrange interpolation polynomial with respect to the parameter. We show that it induces a non-trivial pairing on H0(Mregn) × H0(Mreg) already for n=2.