Zygmund type spaces of harmonic functions on the real unit ball
Abstract
In this paper, we obtain several characterizations of harmonic Zygmund type spaces on the real unit ball B of Rn. First, we characterize the harmonic Zygmund space HZα (0<α≤2) in terms of Zygmund type conditions. Our result extends Theorem 3.4 of [M. Aljuaid and F. Colonna, On the harmonic Zygmund spaces, Bull. Aust. Math. Soc. 101 (2020), 466--476.] to the setting of the real unit ball B. Second, we establish an analogue of the Holland-Walsh characterization of the harmonic Zygmund space HZ. Finally, an integral characterization of HZα is also discussed. All obtained results can be viewed as counterparts of the known results for Bloch spaces.
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