Perturbed Gaussian generating functions for universal knot invariants

Abstract

We introduce a new approach to universal quantum knot invariants that emphasizes generating functions instead of generators and relations. All the relevant generating functions are shown to be perturbed Gaussians of the form PeG, where G is quadratic and P is a suitably restricted "perturbation". After developing a calculus for such Gaussians in general we focus on the rank one invariant ZD in detail. We discuss how it dominates the sl2-colored Jones polynomials and relates to knot genus and Whitehead doubling. In addition to being a strong knot invariant that behaves well under natural operations on tangles ZD is also computable in polynomial time in the crossing number of the knot. We provide a full implementation of the invariant and provide a table in an appendix.