English

A propos de la conjecture de Nash

Algebraic Geometry 2007-05-23 v1

Abstract

This paper deals with the Nash problem, which claims that there are as many families of arcs on a singular germ of surface UU as there are essential components of the exceptional divisor in the desingularisation of this singularity. Let H=Nαˉ\mathcal{H}=\bigcup \bar{N_\alpha} be a particular decomposition of the set of arcs on UU, described later on. We give two new conditions to insure that Nαˉ⊄Nβˉ\bar{N_\alpha}\not \subset \bar{N_\beta}, αβ\alpha \not = \beta; more precisely,for the first one, we claim that if there exists fOUf \in {\mathcal{O}}_{U} such that ordEα(f)<ordEβ(f)ord_{E_\alpha}(f)<ord_{E_\beta}(f), where Eα,EβE_\alpha, E_\beta are exceptional divisors of the desingularisation, then Nαˉ⊄Nβˉ\bar{N_\alpha}\not \subset \bar{N_\beta}. The second condition, used when the singularity is rational and of surface, is the following:let (S,s)(S,s) et (S,s)(S',s') be two rational surface singularities so that there exist a dominant and birational morphism π\pi from (S,s)(S,s) to (S,s)(S',s');then,let Eα,EβE_\alpha, E_\beta be two essential components of the exceptional divisors in the minimal desingularisation of (S,s)(S,s), such that their image by π\pi, EαE'_\alpha and EβE'_\beta, are exceptional divisor for (S,s)(S',s'); if Nαˉ(S,s)⊄Nβˉ(S,s)\bar{N'_\alpha}(S',s')\not \subset \bar{N'_\beta}(S',s') then Nαˉ(S,s)⊄Nβˉ(S,s)\bar{N_\alpha}(S,s)\not \subset \bar{N_\beta}(S,s). These two conditions are simple, but it allows us to prove quite directly the conjecture for the rational minimal surface singularities, using the decomposition of minimal suface singularities into cyclic quotient singularities of type AnA_n. A proof of the conjecture for these singularities has already been given by Ana Reguera.

Keywords

Cite

@article{arxiv.math/0301358,
  title  = {A propos de la conjecture de Nash},
  author = {Camille Plenat},
  journal= {arXiv preprint arXiv:math/0301358},
  year   = {2007}
}

Comments

15 pages, 8 figure. Prepublication du Laboratoire Emile Picard. See also http://picard.ups-tlse.fr