The group Gn2 with a parity and with points

Abstract

In~Ma Manturov studied groups Gnk for fixed integers n and k such that k<n. In particular, Gn2 is isomorphic to the group of free braids of n-stands. In~KiMa Manturov and the author studied an invariant valued in free groups not only for free braids but also for free tangles, which is derived from the group Gn2. On the other hands, in~FeMa Manturov and Fedoseev studied groups Br2n of virtual braids with parity and groups Brdn of virtual braids with dots. They showed that there is a monomorphism from Br2n to Brdn and it is deduced that a parity of the braid can be represented by a geometric object, dots on strands. In this paper we study Gn2 with structures, which are corresponded to parity and points on a braid, which are denoted by Gn,p2 and Gn,d2, respectively. In section 3, it is proved that there is a monomorphism from Gn2 to Gn,p2 and that there is a monomorphism from Gn,p2 to Gn,d2. By the homomorphism from Gn2 to Gn,p2, it can be deduced that a given parity of a braid has geometric representation, which is the number of points on the braid. In section 4, it can be proved that for each element β in Gn,d2, an element in Gn+12 obtained by adding another strand by tracing points on β. That is, a parity of free braid of n-stands is represented not only by points on strands, but also by an n+1-th strand. Conversely, for a braid of n+1-strands, a braid of n-strands is obtained by deleting one strand of the braid of n+1-strand. Finally, we will simply discuss about the way to adjust the previous observations to know whether a given braid is Brunnian or not.