The classification of the virtually cyclic subgroups of the sphere braid groups

Abstract

We study the problem of determining the isomorphism classes of the virtually cyclic subgroups of the n-string braid groups Bn(S2) of the 2-sphere S2. If n is odd, or if n is even and sufficiently large, we obtain the complete classification. For small even values of n, the classification is complete up to an explicit finite number of open cases. In order to prove our main theorem, we obtain a number of other results of independent interest, notably the characterisation of the centralisers and normalisers of the finite cyclic and dicyclic subgroups of Bn(S2), a result concerning conjugate powers of finite order elements, an analysis of the isomorphism classes of the amalgamated products that occur as subgroups of Bn(S2), as well as an alternative proof of the fact that the universal covering space of the n-th configuration space of S2 has the homotopy type of S3 if n is greater than or equal to three.