Tauberian conditions, Muckenhoupt weights, and differentiation properties of weighted bases

Abstract

We give an alternative characterization of the class of Muckenhoupt weights A∞, B for homothecy invariant Muckenhoupt bases B consisting of convex sets. In particular we show that w∈ A∞, B if and only if there exists a constant c>0 such that for all measurable sets E⊂ Rn we have w(x∈ Rn: M B ( 1E)(x)>1/2) < c w(E). This applies for example to the collection R of rectangles with sides parallel to the coordinate axes, giving a new characterization of strong (multiparameter) Muckenhoupt weights. We also show versions of these results under the presence of a doubling measure. Thus the strong maximal function M R,μ, defined with respect to a product-doubling measure μ, is bounded on Lp(μ) for some p>1 if and only if μ(x∈ Rn: M R,μ (1E)(x)>1/2) < c μ(E) for all measurable sets E⊂ Rn. Finally we discuss applications in differentiation theory, proving among other things that Tauberian conditions as above imply that the corresponding bases differentiate L∞(μ), with respect to the measure μ.