The V1- and V2-polynomials of a long virtual knot

Abstract

We introduce two polynomial invariants V1(K;t) and V2(K;t) of a long virtual knot K, which generalize the degree-two finite type invariants v2,1 and v2,2 of Goussarov, Polyak, and Viro. We establish their fundamental properties and show that any pair of Laurent polynomials can be realized as (V1(K;t),V2(K;t)) for some long virtual knot K. While these polynomials are not finite type invariants of any degree with respect to virtualizations, their first derivatives at t=1 define finite type invariants of degree three. As an application, we obtain an explicit Gauss diagram formula for the α3-invariant.