Space of chord diagrams on spherical curves

Abstract

In this paper, we give a definition of Z-valued functions from the ambient isotopy classes of spherical/plane curves derived from chord diagrams, denoted by Σi αi xi. Then, we introduce certain elements of the free Z-module generated by the chord diagrams with at most l chords, called relators of Type (I) ((SII), (WII), (SIII), or (WIII), resp.), and introduce another function Σi αi xi derived from Σi αi xi. The main result (Theorem~1) shows that if Σi αi xi vanishes for the relators of Type (I) ((SII), (WII), (SIII), or (WIII), resp.), then Σi αi xi is invariant under the Reidemeister move of type RI (strong RII, weak RII, strong RIII, or weak RIII, resp.) that is defined in [Ito-Takimura (2013), J. Knot Theory Ramifications].