A remark on isolated complex hypersurface singularities

Abstract

This is now an expository note about the following classical problem. Let (X, 0) be the germ of a hypersurface in ( Cn, 0) with an ordinary singularity of multiplicity m at the origin 0. A natural question to ask is whether X and its tangent cone at the origin are analytically isomorphic. The answer is negative in general, in view of a theorem of Kioji Saito. However there is an integer D(n,m)>m such that, given a regular homogeneous polynomial f(x1,…, xn) of degree m (this means that \ f=0\ is a smooth hypersurface in n-1) then, for all d≥ D(n,m), any convergent power series of the form g=f+ o(d) (here, as usual, o(d) stays for a power series of order at least d), defines a germ \ g=0\ which is analytically equivalent to the germ \ f=0\. In this note we compute D(n,m) explicitly as n(m-2)+1. We also give an extension to the case in which f is a quasihomogeneous polynomial. It was pointed out that the value of D(n,m) was already known by [Exercise 7.31]D.