中文

An algorithmic criterion for basicness in dimension 2

alg-geom 2008-02-03 v1 代数几何

摘要

We give a constructive procedure to check basicness of open (or closed) semialgebraic sets in a compact, non singular, real algebraic surface XX. It is rather clear that if a semialgebraic set SS can be separated from each connected component of X(S\frzS)X\setminus(S\cup\frz S) (when \frzS\frz S stands for the Zariski closure of (\olSInt(S))Reg(X)(\ol S\setminus{\rm Int}(S))\cap{\rm Reg}(X)), then SS is basic. This leads to associate to SS a finite family of sign distributions on X\frzSX\setminus\frz S; we prove the equivalence between basicness and two properties of these distributions, which can be tested by an algorithm. There is a close relation between these two properties and the behaviour of fans in the algebraic functions field of XX associated to a real prime divisor, which gives an easy proof, for a general surface XX, of the well known 4-elements fan's criterion for basicness (Brocker, Andradas-Ruiz). Furthermore, if the criterion fails, using the description of fans in dimension 2, we find an algorithmic method to exhibit the failure. Finally, exploiting this thecnics of sign distribution we give one improvement of the 4-elements fan's criterion of Brocker to check if a semialgebraic set is principal.

引用

@article{arxiv.alg-geom/9312006,
  title  = {An algorithmic criterion for basicness in dimension 2},
  author = {F. Acquistapace and F. Broglia and M. Pilar Velez},
  journal= {arXiv preprint arXiv:alg-geom/9312006},
  year   = {2008}
}

备注

23 pages, amslatex (+bezier.sty) report: 1.89.(766) october 1993