ON THE VOLUME MEAN VALUE PROPERTY FOR M-HARMONIC FUNCTIONS

Title & Authors
ON THE VOLUME MEAN VALUE PROPERTY FOR M-HARMONIC FUNCTIONS
Yi, Jeong-Seon;

Abstract
We will show that if U is a Bergman ball E($\small{\alpha;\;\delta}$) in $\small{B_n\;\subset\;{\mathbb{C}_n}}$ and if U has M-harmonic volume mean value property at a for all M-harmonic functions f on $\ Keywords Bergman ball;involution;M-harmonicity; Language English Cited by References 1. Journal of Functional Analysis, 1993. vol.111. pp.380-397 2. Complex Variables, 1990. vol.13. pp.185-193 3. Proc. Amer. Math. Soc., 1994. vol.122. 4, pp.1029-1034 4. Amer. Math. Soc., 1962. vol.13. pp.830 5. Bull. London Math. Soc., 1972. vol.4. pp.311-312 6. Function Theory in the unit ball of$\mathbb{C}^ n$, 1980. 7. Real and Complex analysis, 1987. 8. Invariant Potential Theory in The Unit Ball of$\mathbb{C}^ n\$, 1994.