Orbit Braid Action on a Finite Generated Group

Abstract: This paper aims to generalize Artin's ideas to establish an one-to-one correspondence between the orbit braid group $B^{orb}_n(\mathbb{C},\mathbb{Z}_p)$ and a quotient of a group formed by some particular homeomorphisms of a punctured plane. First, we find a faithful representation of $B^{orb}_n(\mathbb{C},\mathbb{Z}_p)$ in a finite generated group whose generators are corresponding to generators of fundamental group of the punctured plane, by examining the representation from $B^{orb}_n(\mathbb{C}^{\times},\mathbb{Z}_p)$ to the fundamental group is faithful. Then we investigate some characterizations of orbit braid representation to come to our conclusion.