Brieskorn manifolds, generalised Sieradski groups, and coverings of lens spaces

Abstract

The Brieskorn manifolds B(p,q,r) are the r-fold cyclic coverings of the 3-sphere S3 branched over the torus knot T(p,q). The generalised Sieradski groups S(m,p,q) are groups with m-cyclic pre\-sen\-tation Gm(w), where defining word w has a special form, depending of p and q. In particular, S(m,3,2) = Gm(w) is the group with m generators x1, …, xm and m defining relations w(xi, xi+1, xi+2)=1, where w(xi, xi+1, xi+2) = xi xi+2 xi+1-1. Presentations of S(2n,3,2) in a certain form Gn(w) were investigated by Howie and Williams. They proved that the n-cyclic presentations are geometric, i.e., correspond to the spines of closed orientable 3-manifolds. We establish an analogous result for the groups S(2n,5,2). It is shown that in both cases the manifolds are n-fold cyclic branched coverings of lens spaces. To classify some of constructed manifolds we used the Matveev's computer program "Recognizer".