Transactions of the American Mathematical Society

Boundary limits and non-integrability of $\mathcal {M}$ -subharmonic functions in the unit ball of ${{\mathbb {C}}^{\vphantom {P}}}^{n}$ ( $n\ge 1$ )

Author(s): Manfred Stoll
Journal: Trans. Amer. Math. Soc. 349 (1997), 3773-3785.
MSC (1991): Primary 31B25, 32F05
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Abstract: In this paper we consider weighted non-tangential and tangential boundary limits of non-negative functions on the unit ball $B$

in ${{\mathbb {C}}^{\vphantom {P}}}^{n}$ that are subharmonic with respect to the Laplace-Beltrami operator $\widetilde {\varDelta }$ on $B$

. Since the operator $\widetilde {\varDelta }$ is invariant under the group $\mathcal {M}$ of holomorphic automorphisms of $B$

, functions that are subharmonic with respect to $\widetilde {\varDelta }$ are usually referred to as $\mathcal {M}$ -subharmonic functions. Our main result is as follows: Let $f$

be a non-negative $\mathcal {M}$ -subharmonic function on $B$

satisfying

$\begin{equation*}\int _{B} (1-|z|^{2})^{\gamma }f^{p}(z)\,d\lambda (z)< \infty \end{equation*}$

for some

and some $\gamma >\min \{n,pn\}$ , where $\lambda$ is the $\mathcal {M}$ -invariant measure on $B$

. Suppose $\tau \ge 1$ . Then for a.e. $\zeta \in S$ ,

$\begin{equation*}f^{p}(z)= o\left ((1-|z|^{2})^{n/\tau -\gamma }\right ) \end{equation*}$

uniformly as $z\to \zeta$ in each $\mathcal {T}_{\tau ,\alpha }(\zeta )$ , where for $\alpha >0$ ( $\alpha >\frac {1}{2}$ when $\tau =1$ )

$\begin{equation*}\mathcal {T}_{\tau ,\alpha }(\zeta ) = \{z\in B: |1-\langle z,\zeta \rangle |^{\tau } <\alpha (1-|z|^{2}) \}. \end{equation*}$

We also prove that for $\gamma \le \min \{n,pn\}$ the only non-negative $\mathcal {M}$ -subharmonic function satisfying the above integrability criteria is the zero function.

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