A note on the plane curve singularities in positive characteristic

Abstract

Given an algebroid plane curve f=0 over an algebraically closed field of characteristic p≥ 0 we consider the Milnor number μ(f), the delta invariant δ(f) and the number r(f) of its irreducible components. Put μ(f)=2δ(f)-r(f)+1. If p=0 then μ (f)=μ(f) (the Milnor formula). If p>0 then μ(f) is not an invariant and μ(f) plays the role of μ(f). Let Nf be the Newton polygon of f. We define the numbers μ( Nf) and r( Nf) which can be computed by explicit formulas. The aim of this note is to give a simple proof of the inequality μ(f)-μ( Nf)≥ r( Nf)- r(f)≥ 0 due to Boubakri, Greuel and Markwig. We also prove that μ(f)=μ( Nf) when f is non-degenerate.

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