The topology of real suspension singularities of type f g+zn

Abstract

In this article we study the topology of a family of real analytic germs F (C3,0) (C,0) with isolated critical point at 0, given by F(x,y,z)=f(x,y)g(x,y)+zr, where f and g are holomorphic, r ∈ Z+ and r ≥ 2. We describe the link LF as a graph manifold using its natural open book decomposition, related to the Milnor fibration of the map-germ f g and the description of its monodromy as a quasi-periodic diffeomorphism through its Nielsen invariants. Furthermore, such a germ F gives rise to a Milnor fibration F|F| S5 LF S1. We present a join theorem, which allows us to describe the homotopy type of the Milnor fibre of F and we show some cases where the open book decomposition of S5 given by the Milnor fibration of F cannot come from the Milnor fibration of a complex singularity in C3.