Tauberian constants associated to centered translation invariant density bases

Abstract

This paper provides a necessary and sufficient condition on Tauberian constants associated to a centered translation invariant differentiation basis so that the basis is a density basis. More precisely, given x ∈ Rn, let B = x ∈ Rn B(x) be a collection of bounded open sets in Rn containing x. Suppose moreover that these collections are translation invariant in the sense that, for any two points x and y in Rn we have that B(x + y) = \R + y : R ∈ B(x)\. Associated to these collections is a maximal operator MB given by MBf(x) :=R ∈ B(x) 1|R| ∫R |f|. The Tauberian constants CB(α) associated to MB are given by CB(α) :=E ⊂ Rn 0 < |E| < ∞ 1|E||\x ∈ Rn :\, MBE(x) > α\|. Given 0 < r < ∞, we set Br(x) :=\R ∈ B(x) : diam R < r\, and let Br :=x ∈ Rn Br (x). We prove that B is a density basis if and only if, given 0 < α < ∞, there exists r = r(α) >0 such that CBr(α) < ∞. Subsequently, we construct a centered translation invariant density basis B = x ∈ Rn B(x) such that there does not exist any 0 < r satisfying CBr(α) < ∞ for all 0 < α < 1.