Vassiliev-Kontsevich invariants and Parseval's theorem

Abstract

We use an example to provide evidence for the statement: the Vassiliev-Kontsevich invariants kn of a knot (or braid) k can be redefined so that k = Σ0∞ kn. This constructs a knot from its Vassiliev-Kontsevich invariants, like a power series expansion. The example is pure braids on two strands P2 Z, which leads to solving eτ=q for τ a Laurent series in q. We set τ = Σ1∞ (-1)n+1 (qn - q-n)/n and use Parseval's theorem for Fourier series to prove eτ=q. Finally we describe some problems, particularly a Plancherel theorem for braid groups, whose solution would take us towards a proof of k=Σ0∞ kn.