English

Smooth Selection for Infinite Sets

Functional Analysis 2022-01-04 v2 Classical Analysis and ODEs

Abstract

Whitney's extension problem asks the following: Given a compact set ERnE\subset\mathbb{R}^n and a function f:ERf:E\to \mathbb{R}, how can we tell whether there exists FCm(Rn)F\in C^m(\mathbb{R}^n) such that F=fF=f on EE? A 2006 theorem of Charles Fefferman \cite{F06} answers this question in its full generality. In this paper, we establish a version of this theorem adapted for variants of the Whitney extension problem, including nonnegative extensions and the smooth selection problems. Among other things, we generalize the Finiteness Principle for smooth selection by Fefferman-Israel-Luli \cite{FIL16} to the setting of infinite sets. Our main result is stated in terms of the iterated Glaeser refinement of a bundle formed by taking potential Taylor polynomials at each point of EE. In particular, we show that such bundles (and any bundles with closed, convex fibers) stabilize after a bounded number of Glaeser refinements, thus strengthening the previous results of Glaeser, Bierstone-Milman-Paw{\l}ucki, and Fefferman which only hold for bundles with affine fibers.

Cite

@article{arxiv.2109.04905,
  title  = {Smooth Selection for Infinite Sets},
  author = {Fushuai Jiang and Garving K. Luli and Kevin O'Neill},
  journal= {arXiv preprint arXiv:2109.04905},
  year   = {2022}
}

Comments

59 pages. The second version corrected a minor mistake in the previous version and some typos

R2 v1 2026-06-24T05:51:43.871Z