Standard Bases for Fractional Ideals of the Local Ring of an Algebroid Curve

Abstract

In this paper we present an algorithm to compute a Standard Basis for a fractional ideal I of the local ring O of an n-space algebroid curve with several branches. This allows us to determine the semimodule of values of I. When I=O, we may obtain a (finite) set of generators of the semiring of values of the curve, which determines its classical semigroup. In the complex context, identifying the K\"ahler differential module O/C of a plane curve with a fractional ideal of O and applying our algorithm, we can compute the set of values of O/C, which is an important analytic invariant associated to the curve.