English

Differentiable approximation of continuous semialgebraic maps

Algebraic Geometry 2019-07-25 v1

Abstract

In this work we approach the problem of approximating uniformly continuous semialgebraic maps f:STf:S\to T from a compact semialgebraic set SS to an arbitrary semialgebraic set TT by semialgebraic maps g:STg:S\to T that are differentiable of class~Cν{\mathcal C}^\nu for a fixed integer ν1\nu\geq1. As the reader can expect, the difficulty arises mainly when one tries to keep the same target space after approximation. For ν=1\nu=1 we give a complete affirmative solution to the problem: such a uniform approximation is always possible. For ν2\nu \geq 2 we obtain density results in the two following relevant situations: either TT is compact and locally Cν{\mathcal C}^\nu semialgebraically equivalent to a polyhedron, for instance when TT is a compact polyhedron; or TT is an open semialgebraic subset of a Nash set, for instance when TT is a Nash set. Our density results are based on a recent C1{\mathcal C}^1-triangulation theorem for semialgebraic sets due to Ohmoto and Shiota, and on new approximation techniques we develop in the present paper. Our results are sharp in a sense we specify by explicit examples.

Keywords

Cite

@article{arxiv.1805.03520,
  title  = {Differentiable approximation of continuous semialgebraic maps},
  author = {José F. Fernando and Riccardo Ghiloni},
  journal= {arXiv preprint arXiv:1805.03520},
  year   = {2019}
}

Comments

26 pages

R2 v1 2026-06-23T01:49:39.475Z