Fine properties of Besov functions Brq,∞ in metric spaces

Abstract

Let X be a metric space and μ an s-regular Ahlfors measure. Let Y be a metric space. We prove that for Besov functions u ∈ Brq,∞(X,μ;Y), every point is a general average Lebesgue point of u outside a σ-finite set with respect to the Hausdorff measure Hs - rq. The proof is based on density-type estimates involving Hausdorff measure. In addition, we prove that for functions u in the fractional Sobolev space Wr,q(X,μ;Y), almost every point with respect to Hs - rq is an average Lebesgue point of u. Finally, if Y is also complete, we prove that for u ∈ Brq,∞(X,μ;Y), almost every point is a Lebesgue point outside a set of Hausdorff dimension at most s - rq.

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