English

Arc-smooth functions on closed sets

Classical Analysis and ODEs 2019-03-27 v3 Algebraic Geometry Differential Geometry

Abstract

By an influential theorem of Boman, a function ff on an open set UU in Rd\mathbb R^d is smooth (C\mathcal C^\infty) if and only if it is arc-smooth, i.e., fcf\circ c is smooth for every smooth curve c:RUc : \mathbb R \to U. In this paper we investigate the validity of this result on closed sets. Our main focus is on sets which are the closure of their interior, so-called fat sets. We obtain an analogue of Boman's theorem on fat closed sets with H\"older boundary and on fat closed subanalytic sets with the property that every boundary point has a basis of neighborhoods each of which intersects the interior in a connected set. If XRdX \subseteq \mathbb R^d is any such set and f:XRf : X \to \mathbb R is arc-smooth, then ff extends to a smooth function defined on Rd\mathbb R^d. We also get a version of the Bochnak-Siciak theorem on all closed fat subanalytic and all closed sets with H\"older boundary: if f:XRf : X \to \mathbb R is the restriction of a smooth function on Rd\mathbb R^d which is real analytic along all real analytic curves in XX, then ff extends to a holomorphic function on a neighborhood of XX in Cd\mathbb C^d. Similar results hold for non-quasianalytic Denjoy-Carleman classes (of Roumieu type). We will also discuss sharpness and applications of these results.

Keywords

Cite

@article{arxiv.1801.08335,
  title  = {Arc-smooth functions on closed sets},
  author = {Armin Rainer},
  journal= {arXiv preprint arXiv:1801.08335},
  year   = {2019}
}

Comments

34 pages, 3 figures. The article was restructured and hence the numbering changed. The real analytic results were strengthened, some proofs simplified. Theorem 1.19 and results dependent on it were corrected

R2 v1 2026-06-22T23:55:43.040Z