On μ-Zariski pairs of links

Abstract

The notion of Zariski pairs for projective curves in P2 is known since the pioneer paper of Zariski Zariski and for further development, we refer the reference in Bartolo.In this paper, we introduce a notion of Zariski pair of links in the class of isolated hypersurface singularities. Such a pair is canonically produced from a Zariski (or a weak Zariski ) pair of curves C=\f(x,y,z)=0\ and C'=\g(x,y,z)=0\ of degree d by simply adding a monomial zd+m to f and g so that the corresponding affine hypersurfaces have isolated singularities at the origin. They have a same zeta function and a same Milnor number (Almost). We give new examples of Zariski pairs which have the same μ* sequence and a same zeta function but two functions belong to different connected components of μ-constant strata (Theorem mu-zariski). Two link 3-folds are not diffeomorphic and they are distinguished by the first homology which implies the Jordan form of their monodromies are different (Theorem main2). We start from weak Zariski pairs of projective curves to construct new Zariski pairs of surfaces which have non-diffeomorphic link 3-folds. We also prove that hypersurface pair constructed from a Zariski pair give a diffeomorphic links (Theorem main3).