Zeta-function and μ*-Zariski pairs of surfaces

Abstract

A Zariski pair of surfaces is a pair of complex polynomial functions in C3 which is obtained from a classical Zariski pair of projective curves f0(z1,z2,z3)=0 and f1(z1,z2,z3)=0 of degree d in P2 by adding a same term of the form zid+m (m≥ 1) to both f0 and f1 so that the corresponding affine surfaces of C3 -- defined by g0:=f0+zid+m and g1:=f1+zid+m -- have an isolated singularity at the origin and the same zeta-function for the monodromy associated with their Milnor fibrations (so, in particular, g0 and g1 have the same Milnor number). In the present paper, we show that if f0 and f1 are "convenient" with respect to the coordinates (z1,z2,z3) and if the singularities of the curves f0=0 and f1=0 are Newton non-degenerate in some suitable local coordinates, then (g0,g1) is a μ*-Zariski pair of surfaces, that is, a Zariski pair of surfaces whose polynomials g0 and g1 have the same Teissier's μ*-sequence but lie in different path-connected components of the μ*-constant stratum. To this end, we prove a new general formula that gives, under appropriate conditions, the Milnor number of functions of the above type, and we show (in a general setting) that two polynomials functions lying in the same path-connected component of the μ*-constant stratum can always be joined by a "piecewise complex-analytic path".