English

Cutting sets of continuous functions on the unit interval

Classical Analysis and ODEs 2023-01-24 v1

Abstract

For a function f ⁣:[0,1]Rf\colon [0,1]\to\mathbb R, we consider the set E(f)E(f) of points at which ff cuts the real axis. Given f ⁣:[0,1]Rf\colon [0,1]\to\mathbb R and a Cantor set D[0,1]D\subset [0,1] with {0,1}D\{0,1\}\subset D, we obtain conditions equivalent to the conjunction fC[0,1]f\in C[0,1] (or fC[0,1]f\in C^\infty [0,1]) and DE(f)D\subset E(f). This generalizes some ideas of Zabeti. We observe that, if ff is continuous, then E(f)E(f) is a closed nowhere dense subset of f1[{0}]f^{-1}[\{ 0\}] where each x{0,1}E(f)x\in \{0,1\}\cap E(f) is an accumulation point of E(f)E(f). Our main result states that, for a closed nowhere dense set F[0,1]F\subset [0,1] with each x{0,1}E(f)x\in \{0,1\}\cap E(f) being an accumulation point of FF, there exists fC[0,1]f\in C^\infty [0,1] such that F=E(f)F=E(f).

Keywords

Cite

@article{arxiv.2107.00619,
  title  = {Cutting sets of continuous functions on the unit interval},
  author = {Marek Balcerzak and Piotr Nowakowski and Michał Popławski},
  journal= {arXiv preprint arXiv:2107.00619},
  year   = {2023}
}
R2 v1 2026-06-24T03:49:00.577Z