Quasi-ordinary singularities: tree model, discriminant and irreducibility

Abstract

Let f(Y)∈ K[[X1,…,Xd]][Y] be a quasi-ordinary Weierstrass polynomial with coefficients in the ring of formal power series over an algebraically closed field of characteristic zero. In this paper we study the discriminant Df of f(Y)-V, where V is a new variable. We show that the Newton polytope of Df depends only on contacts between the roots of f(Y). Then we prove that f(Y) is irreducible if and only if the Newton polytope of Df satisfies some arithmetic conditions. Finally we generalize these results to quasi-ordinary power series.