Arrow diagrams on spherical curves and computations

Abstract

We give a definition of an integer-valued function Σi αi x *i derived from arrow diagrams for the ambient isotopy classes of oriented spherical curves. Then, we introduce certain elements of the free Z-module generated by the arrow diagrams with at most l arrows, called relators of Type~(I) ((SI\!I ), (WI\!I), (SI\!I\!I), or ( WI\!I\!I), resp.), and introduce another function Σi αi x*i to obtain Σi αi x*i. One of the main results shows that if Σi αi x*i vanishes on finitely many relators of Type~(I) ((SI\!I) , (WI\!I), (SI\!I\!I), or (WI\! I\!I), resp.), then Σi αi x is invariant under the deformation of type RI (strongRI\!I, weakRI\!I, strongRI\!I\!I, or weakRI\!I\!I, resp.). The other main result is that we obtain functions of arrow diagrams with up to six arrows. This computation is done with the aid of computers.