Higher Order Polars of Quasi-Ordinary Singularities

  1. García Barroso, Evelia R 1
  2. Gwoździewicz, Janusz 2
  1. 1 Universidad de La Laguna
    info

    Universidad de La Laguna

    San Cristobal de La Laguna, España

    ROR https://ror.org/01r9z8p25

  2. 2 Institute of Mathematics, Pedagogical University of Kraków, Podchoŗżych 2, PL-30-084 Cracow, Poland
Revista:
International Mathematics Research Notices

ISSN: 1073-7928 1687-0247

Año de publicación: 2022

Volumen: 2022

Número: 2

Páginas: 1045-1080

Tipo: Artículo

DOI: 10.1093/IMRN/RNAA106 GOOGLE SCHOLAR lock_openAcceso abierto editor

Otras publicaciones en: International Mathematics Research Notices

Resumen

Abstract A quasi-ordinary polynomial is a monic polynomial with coefficients in the power series ring such that its discriminant equals a monomial up to unit. In this paper, we study higher derivatives of quasi-ordinary polynomials, also called higher order polars. We find factorizations of these polars. Our research in this paper goes in two directions. We generalize the results of Casas–Alvero and our previous results on higher order polars in the plane to irreducible quasi-ordinary polynomials. We also generalize the factorization of the first polar of a quasi-ordinary polynomial (not necessarily irreducible) given by the first-named author and González-Pérez to higher order polars. This is a new result even in the plane case. Our results remain true when we replace quasi-ordinary polynomials by quasi-ordinary power series.

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