Multipoint Characterization of Higher-Order Sobolev Spaces
Abstract
In the paper, we prove a rather general characterization of higher-order Sobolev spaces. We show that the kth-order regularity, where k ∈ N, is captured via inequalities involving 2k-tuples of points. In fact, in full generality, the obtained results characterize higher-order Sobolev spaces based on Banach function spaces. Moreover, we show an analogous characterization of higher-order Hölder spaces. Finally, we propose a way to use the obtained results to define higher-order Sobolev and Hölder spaces on metric measure spaces.
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