Variations on the Boman covering lemma

Abstract

We explore some variants of the Boman covering lemma, and their relationship to the boundedness properties of the maximal operator. Let 1 < p < ∞ and let q be its conjugate exponent. We prove that the strong type (q,q) of the uncentered maximal operator, by itself, implies certain generalizations of the Boman covering lemma for the exponent p, and in turn, these generalizations entail the weak type (q,q) of the centered maximal operator. We show by example that it is possible for the uncentered maximal operator to be unbounded for all 1 < s < ∞, while the conclusion of the lemma holds for every 1 < p < ∞; thus, the latter condition is much weaker. Also, the boundedness of the centered maximal operator entails weak versions of the lemma.