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http://dx.doi.org/10.4134/CKMS.2003.18.3.481

ON THE VOLUME MEAN VALUE PROPERTY FOR M-HARMONIC FUNCTIONS  

Yi, Jeong-Seon (Department of Mathematics Catholic University)
Publication Information
Communications of the Korean Mathematical Society / v.18, no.3, 2003 , pp. 481-484 More about this Journal
Abstract
We will show that if U is a Bergman ball E($\alpha;\;\delta$) in $B_n\;\subset\;{\mathbb{C}_n}$ and if U has M-harmonic volume mean value property at a for all M-harmonic functions f on $\={U} $, then U must be a ball centered at the origin with $\alpha\;=\;0$.
Keywords
Bergman ball; involution; M-harmonicity;
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