A new Proof of Desingularization over fields of characteristic zero

  1. Encinas Carrión, Santiago
  2. Villamayor, Orlando E.
Zeitschrift:
Revista matemática iberoamericana

ISSN: 0213-2230

Datum der Publikation: 2003

Ausgabe: 19

Nummer: 2

Seiten: 339-353

Art: Artikel

DOI: 10.4171/RMI/350 DIALNET GOOGLE SCHOLAR

Andere Publikationen in: Revista matemática iberoamericana

Ziele für nachhaltige Entwicklung

Zusammenfassung

We present a proof of embedded desingularization for closed subschemes which does not make use of Hilbert-Samuel function and avoids Hironaka's notion of normal flatness (see also \cite{EncinasVillamayor2000} page 224). Given a subscheme defined by equations, we prove that embedded desingularization can be achieved by a sequence of monoidal transformations; where the law of transformation on the equations defining the subscheme is simpler then that used in Hironaka's procedure. This is done by showing that desingularization of a closed subscheme $X$, in a smooth sheme $W$, is achieved by taking an algorithmic principalization for the ideal $I(X)$, associated to the embedded scheme $X$. This provides a conceptual simplification of the original proof of Hironaka. This algorithm of principalization (of Log-resolution of ideals), and this new procedure of embedded desingularization discussed here, have been implemented in MAPLE.