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A mean value theorem on bounded symmetric domains

Authors:	Miroslav Englis

Institution:	MÚ AV CR, Zitná 25, 11567 Prague 1, Czech Republic

Abstract:	Let $\Omega$ be a Cartan domain of rank and genus and $B_\nu$ , $\nu >p-1$ , the Berezin transform on $\Omega$ ; the number $B_{\nu }f(z)$ can be interpreted as a certain invariant-mean-value of a function around . We show that a Lebesgue integrable function satisfying $f=B_\nu f=B_{\nu +1}f=\dots =B_{\nu +r}f$ , $\nu \ge p$ , must be $\mathcal{M}$ -harmonic. In a sense, this result is reminiscent of Delsarte's two-radius mean-value theorem for ordinary harmonic functions on the complex -space $\mathbf{C}^{n}$ , but with the role of radius played by the quantity $1/\nu$ .

Keywords:	Berezin transform bounded symmetric domains invariant mean-value property

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