Abstract
We investigate variants of a three circles type theorem in the context of $\mathcal{Q}-$valued functions. We prove some convexity inequalities related to the $L^{2}$-growth function in the $\mathcal{Q}-$valued settings. Optimality of these inequalities and comparsion to the case of real valued harmonic functions is also discussed.
Citation
Immanuel Ben Porat. "Convexity In Multivalued Harmonic Functions." Real Anal. Exchange 47 (2) 261 - 280, 2022. https://doi.org/10.14321/realanalexch.47.2.1582827875
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