Abstract
We prove that complex harmonic functions in the Lie ball can be represented in Dirichlet series by showing the equivalent fact that it can be constructed explicitly a discrete weakly sufficient set for the space of entire functions of exponential type on the complex light cone.
Citation
Hai Khôi LÊ. Mitsuo MORIMOTO. "Representation of Harmonic Functions in the Lie Ball by Dirichlet Series." Tokyo J. Math. 20 (2) 331 - 342, December 1997. https://doi.org/10.3836/tjm/1270042107
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