Minimal unknotting sequences of Reidemeister moves containing unmatched RII moves

Abstract

Arnold introduced invariants J+, J- and St for generic planar curves. It is known that both J+ /2 + St and J- /2 + St are invariants for generic spherical curves. Applying these invariants to underlying curves of knot diagrams, we can obtain lower bounds for the number of Reidemeister moves for uknotting. J- /2 + St works well for unmatched RII moves. However, it works only by halves for RI moves. Let w denote the writhe for a knot diagram. We show that J- /2 + St w/2 works well also for RI moves, and demonstrate that it gives a precise estimation for a certain knot diagram of the unknot with the underlying curve r = 2 + (n θ/(n+1)),\ (0 θ 2(n+1)π).