Open book decompositions of S5 and real singularities

Abstract

In this article, we study the topology of the family of real analytic germs F (C3,0) (C,0) given by F(x,y,z)=xy(xp+yq)+zr with p,q,r ∈ N, p,q,r ≥ 2 and (p,q)=1. Such a germ has isolated singularity at 0 and gives rise to a Milnor fibration F|F| S5 LF S1. We describe the link LF as a Seifert manifold and we show that it is always homeomorphic to the link of a complex singularity. However, we prove that in almost all the cases 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.