Cyclic branched covers of knots as links of real isolated singularities

Abstract

Given a real analytic function f from R4 to R2 with isolated critical point at the origin, the link Lf of the singularity is a real fibred knot in S3. From this singularities, we construct a family of real isolated suspension singularities from R6 to R2 such that its links are the total spaces of the n-branched cyclic coverings over the corresponding knots. In this way we obtain as links of singularities, 3-manifolds that does not appear in the complex case, such as hyperbolic 3-manifolds or the Hantzsche-Wendt manifold.