The minimal sequence of Reidemister moves bringing the diagram of (n+1,n)-torus knot to that of (n,n+1)-torus knot

Abstract

Let D(p,q) be the usual knot diagram of the (p,q)-torus knot, that is, D(p,q) is the closure of the p-braid (σ1-1 σ2-1... σp-1-1)q. As is well-known, D(p,q) and D(q,p) represent the same knot. It is shown that D(n+1,n) can be deformed to D(n,n+1) by a sequence of \(n-1)n(2n-1)/6 \ + 1 Reidemeister moves, which consists of a single RI move and (n-1)n(2n-1)/6 RIII moves. Using cowrithe, we show that this sequence is minimal over all sequences which bring D(n+1,n) to D(n,n+1).