On the topology of the transversal slice of a quasi-homogeneous map germ

Abstract

We consider a corank 1, finitely determined, quasi-homogeneous map germ f from (C2,0) to (C3,0). We describe the embedded topological type of a generic hyperplane section of f(C2), denoted by γf, in terms of the weights and degrees of f. As a consequence, a necessary condition for a corank 1 finitely determined map germ g:(C2,0)→ (C3,0) to be quasi-homogeneous is that the plane curve γg has either two or three characteristic exponents. As an application of our main result, we also show that any one-parameter unfolding F=(ft,t) of f which adds only terms of the same degrees as the degrees of f is Whitney equisingular.