English

De Branges' theorem on approximation problems of Bernstein type

Complex Variables 2012-07-24 v1 Functional Analysis

Abstract

The Bernstein approximation problem is to determine whether or not the space of all polynomials is dense in a given weighted C0C_0-space on the real line. A theorem of L. de Branges characterizes non--density by existence of an entire function of Krein class being related with the weight in a certain way. An analogous result holds true for weighted sup--norm approximation by entire functions of exponential type at most τ\tau and bounded on the real axis (τ>0\tau>0 fixed). We consider approximation in weighted C0C_0-spaces by functions belonging to a prescribed subspace of entire functions which is solely assumed to be invariant under division of zeros and passing from F(z)F(z) to F(zˉ)ˉ\bar{F(\bar z)}, and establish the precise analogue of de Branges' theorem. For the proof we follow the lines of de Branges' original proof, and employ some results of L. Pitt.

Keywords

Cite

@article{arxiv.1207.5126,
  title  = {De Branges' theorem on approximation problems of Bernstein type},
  author = {Anton Baranov and Harald Woracek},
  journal= {arXiv preprint arXiv:1207.5126},
  year   = {2012}
}
R2 v1 2026-06-21T21:39:26.747Z