Proximinality and uniformly approximable sets in Lp

Abstract

For any p∈[1,∞], we prove that the set of simple functions taking at most k different values is proximinal in Lp for all k≥ 1. We introduce the class of uniformly approximable subsets of Lp, which is larger than the class of uniformly integrable sets. This new class is characterized in terms of the p-variation if p∈[1,∞) and in terms of covering numbers if p=∞. We study properties of uniformly approximable sets. In particular, we prove that the convex hull of a uniformly approximable bounded set is also uniformly approximable and that this class is stable under H\"older transformations. We also prove that, for p∈ [1,∞), the unit ball of Lp is uniformly approximable if and only if Lp is finite-dimensional, while for p=∞ the unit ball is always uniformly approximable.