Traces of vanishing H\"older spaces

Abstract

For an arbitrary subset E⊂Rn, we introduce and study the three vanishing subspaces of the H\"older space C0,ω(E) consisting of those functions for which the ratio |f(x)-f(y)|/ω(|x-y|) vanishes, when (1) |x-y| 0 , (2) |x-y|∞ or (3) (|x|,|y|)∞. We prove that the Whitney extension operator maps each of these vanishing subspaces from E to the corresponding vanishing spaces defined on the whole ambient space Rn. In fact, this follows as the zeroth order special case of a more general problem involving higher order derivatives. As a consequence, we obtain complete characterizations of approximability of H\"older functions C0,ω(E) by Lipschitz and boundedly supported functions.