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The Milnor number of an isolated hypersurface singularity, defined as the codimension µ( f ) of t... more The Milnor number of an isolated hypersurface singularity, defined as the codimension µ( f ) of the ideal generated by the partial derivatives of a power series f whose zeros represent locally the hypersurface, is an important topological invariant of the singularity over the complex numbers, but its meaning changes dramatically when the base field is arbitrary. It turns out that if the ground field is of positive characteristic, this number is not even invariant under contact equivalence of the local equation f . In this paper we study the variation of the Milnor number in the contact class of f , giving necessary and sufficient conditions for its invariance. We also relate, for an isolated singularity, the finiteness of µ( f ) to the smoothness of the generic fiber f = s. Finally, we prove that the Milnor number coincides with the conductor of a plane branch when the characteristic does not divide any of the minimal generators of its semigroup of values, showing in particular that this is a sufficient (but not necessary) condition for the invariance of the Milnor number in the whole equisingularity class of f .
The Milnor number of an isolated hypersurface singularity, defined as the codimension µ( f ) of t... more The Milnor number of an isolated hypersurface singularity, defined as the codimension µ( f ) of the ideal generated by the partial derivatives of a power series f whose zeros represent locally the hypersurface, is an important topological invariant of the singularity over the complex numbers, but its meaning changes dramatically when the base field is arbitrary. It turns out that if the ground field is of positive characteristic, this number is not even invariant under contact equivalence of the local equation f . In this paper we study the variation of the Milnor number in the contact class of f , giving necessary and sufficient conditions for its invariance. We also relate, for an isolated singularity, the finiteness of µ( f ) to the smoothness of the generic fiber f = s. Finally, we prove that the Milnor number coincides with the conductor of a plane branch when the characteristic does not divide any of the minimal generators of its semigroup of values, showing in particular that this is a sufficient (but not necessary) condition for the invariance of the Milnor number in the whole equisingularity class of f .