English

The approximate variation to pointwise selection principles

Functional Analysis 2021-11-05 v1

Abstract

Let TRT\subset\mathbb{R}, MM be a metric space with metric dd, and MTM^T be the set of all functions mapping TT into MM. Given fMTf\in M^T, we study the properties of the approximate variation {Vε(f)}ε>0\{V_\varepsilon(f)\}_{\varepsilon>0}, where Vε(f)V_\varepsilon(f) is the greatest lower bound of Jordan variations V(g)V(g) of functions gMTg\in M^T such that d(f(t),g(t))εd(f(t),g(t))\le\varepsilon for all tTt\in T. The notion of ε\varepsilon-variation Vε(f)V_\varepsilon(f) was introduced by Fra\'nkov\'a [Math. Bohem. 116 (1991), 20-59] for intervals T=[a,b]T=[a,b] in R\mathbb{R} and M=RNM=\mathbb{R}^N and extended to the general case by Chistyakov and Chistyakova [Studia Math. 238 (2017), 37-57]. We prove directly the following basic pointwise selection principle: If a sequence of functions {fj}j=1\{f_j\}_{j=1}^\infty from MTM^T is such that the closure in MM of the set {fj(t):jN}\{f_j(t):j\in\mathbb{N}\} is compact for all tTt\in T and lim supjVε(fj)\limsup_{j\to\infty}V_\varepsilon(f_j) is finite for all ε>0\varepsilon>0, then it contains a subsequence, which converges pointwise on TT to a bounded regulated function fMTf\in M^T. We establish several variants of this result for sequences of regulated and nonregulated functions, for functions with values in reflexive separable Banach spaces, for the almost everywhere convergence and weak pointwise convergence of extracted subsequences, and comment on the necessity of assumptions in the selection principles. The sharpness of all assertions is illustrated by examples.

Keywords

Cite

@article{arxiv.1910.08490,
  title  = {The approximate variation to pointwise selection principles},
  author = {Vyacheslav V. Chistyakov},
  journal= {arXiv preprint arXiv:1910.08490},
  year   = {2021}
}

Comments

67 pages, LaTeX, uses dis.cls

R2 v1 2026-06-23T11:47:58.564Z