MINIMALITY OF A TORIC EMBEDDED RESOLUTION OF RATIONAL TRIPLE POINTS AFTER BOUVIER-GONZALEZ-SPRINBERG


Şen B. K., Plénat C., TOSUN M.

Kodai Mathematical Journal, vol.47, no.3, pp.395-427, 2024 (SCI-Expanded) identifier

  • Publication Type: Article / Article
  • Volume: 47 Issue: 3
  • Publication Date: 2024
  • Doi Number: 10.2996/kmj47305
  • Journal Name: Kodai Mathematical Journal
  • Journal Indexes: Science Citation Index Expanded (SCI-EXPANDED), Scopus, MathSciNet, zbMATH
  • Page Numbers: pp.395-427
  • Keywords: jet schemes, Newton polyhedron, profile, Singularities, toric resolutions
  • Galatasaray University Affiliated: Yes

Abstract

Nash’s problem concerning arcs poses the question of whether it is possible to construct a bijective relationship between the minimal resolution of a surface singularity and the irreducible components within its arcs space. As a reverse question, one might inquire whether it is possible to derive a resolution from the arcs space of the given singularity. This paper focuses on non-isolated hypersurface singularities in C3 whose normalisations are surface in C4 having rational singularities of multiplicity 3. For each of these singularities, we construct a non singular refinement of its dual Newton polyhedron with valuations attached to specific irreducible components of its jet schemes. Subsequently, we get a toric embedded resolution of these singularities. To establish the minimality of this resolution, we generalize the notion of a profile of a simplicial cone, as introduced in [6]. As a corollary, we obtain that the Hilbert basis of the dual Newton polyhedron of a rational singularity with multiplicity 3 provides a minimal toric embedded resolution for our singularities.