English

Rings of differentiable semialgebraic functions

Algebraic Geometry 2019-08-21 v1

Abstract

In this work we analyze the main properties of the Zariski and maximal spectra of the ring Sr(M){\mathcal S}^r(M) of differentiable semialgebraic functions of class Cr{\mathcal C}^r on a semialgebraic set MRmM\subset\mathbb{R}^m. Denote S0(M){\mathcal S}^0(M) the ring of semialgebraic functions on MM that admit a continuous extension to an open semialgebraic neighborhood of MM in cl(M)\text{cl}(M). This ring is the real closure of Sr(M){\mathcal S}^r(M). If MM is locally compact, the ring Sr(M){\mathcal S}^r(M) enjoys a Lojasiewicz's Nullstellensatz, which becomes a crucial tool. Despite Sr(M){\mathcal S}^r(M) is not real closed for r1r\geq1, the Zariski and maximal spectra of this ring are homeomorphic to the corresponding ones of the real closed ring S0(M){\mathcal S}^0(M). In addition, the quotients of Sr(M){\mathcal S}^r(M) by its prime ideals have real closed fields of fractions, so the ring Sr(M){\mathcal S}^r(M) is close to be real closed. The missing property is that the sum of two radical ideals needs not to be a radical ideal. The homeomorphism between the spectra of Sr(M){\mathcal S}^r(M) and S0(M){\mathcal S}^0(M) guarantee that all the properties of these rings that arise from spectra are the same for both rings. For instance, the ring Sr(M){\mathcal S}^r(M) is a Gelfand ring and its Krull dimension is equal to dim(M)\dim(M). We also show similar properties for the ring Sr(M){\mathcal S}^{r*}(M) of differentiable bounded semialgebraic functions. In addition, we confront the ring S(M){\mathcal S}^{\infty}(M) of differentiable semialgebraic functions of class C{\mathcal C}^{\infty} with the ring N(M){\mathcal N}(M) of Nash functions on MM.

Keywords

Cite

@article{arxiv.1908.07257,
  title  = {Rings of differentiable semialgebraic functions},
  author = {E. Baro and José F. Fernando and J. M. Gamboa},
  journal= {arXiv preprint arXiv:1908.07257},
  year   = {2019}
}

Comments

40 pages

R2 v1 2026-06-23T10:51:57.531Z