Rings of differentiable semialgebraic functions
Abstract
In this work we analyze the main properties of the Zariski and maximal spectra of the ring of differentiable semialgebraic functions of class on a semialgebraic set . Denote the ring of semialgebraic functions on that admit a continuous extension to an open semialgebraic neighborhood of in . This ring is the real closure of . If is locally compact, the ring enjoys a Lojasiewicz's Nullstellensatz, which becomes a crucial tool. Despite is not real closed for , the Zariski and maximal spectra of this ring are homeomorphic to the corresponding ones of the real closed ring . In addition, the quotients of by its prime ideals have real closed fields of fractions, so the ring 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 and guarantee that all the properties of these rings that arise from spectra are the same for both rings. For instance, the ring is a Gelfand ring and its Krull dimension is equal to . We also show similar properties for the ring of differentiable bounded semialgebraic functions. In addition, we confront the ring of differentiable semialgebraic functions of class with the ring of Nash functions on .
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