Archivio Istituzionale della RicercaThe paper is an introduction to the use of the classical Newton-Puiseux procedure, oriented towards an algorithmic description of it. This procedure allows to obtain polynomial approximations for parameterizations of branches of an algebraic plane curve at a singular point. We look for an approach that can be easily grasped and is almost self-contained. We illustrate the use of the algorithm first in a completely worked out example of a curve with a point of multiplicity 6, and secondly, in the study of triple points on reduced plane curves.
The Newton-Puiseux Algorithm and Triple Points for Plane Curves / Canino, S; Gimigliano, A; Idà, M. - In: MATHEMATICS. - ISSN 2227-7390. - ELETTRONICO. - 11:10(2023), pp. 1-31. [10.3390/math11102324]
The Newton-Puiseux Algorithm and Triple Points for Plane Curves
Canino, S;Gimigliano, A;
2023
Abstract
The paper is an introduction to the use of the classical Newton-Puiseux procedure, oriented towards an algorithmic description of it. This procedure allows to obtain polynomial approximations for parameterizations of branches of an algebraic plane curve at a singular point. We look for an approach that can be easily grasped and is almost self-contained. We illustrate the use of the algorithm first in a completely worked out example of a curve with a point of multiplicity 6, and secondly, in the study of triple points on reduced plane curves.
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https://hdl.handle.net/11583/2982292