We study a family of differential operators ${L^{\alpha}, \alpha \geq 0}$ in the unit ball $D$ of $C^n$ with $n \geq 2$ that generalize the classical Laplacian, $\alpha = 0$, and the conformal Laplacian, $\alpha = 1/2$ (that is, the Laplace-Beltrami operator for Bergman metric in $D$). Using the diffusion processes associated with these (degenerate) differential operators, the boundary behavior of $L^{\alpha}$-harmonic functions is studied in a unified way for $0 \leq \alpha \leq 1/2$. More specifically, we show that a bounded $L^{\alpha}$-harmonic function in $D$ has boundary limits in approaching regions at almost every boundary point and the boundary approaching region increases from the Stolz cone to the Korányi admissible region as $\alpha$ runs from 0 to 1/2. A local version for this Fatou-type result is also established.

Publié le : 1997-07-14
Classification:  Holomorphic diffusions,  conditional process,  hitting probability,  harmonic measure,  martingale,  holomorphic and $L$-harmonic functions,  boundary limit,  approaching region,  Harnack inequality,  60J45,  31B25,  60J60,  31B10

@article{1024404507,
     author = {Chen, Zhen-Qing and Durrett, Richard and Ma, Gang},
     title = {Holomorphic diffusions and boundary behavior of harmonic
 functions},
     journal = {Ann. Probab.},
     volume = {25},
     number = {4},
     year = {1997},
     pages = { 1103-1134},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1024404507}
}

Chen, Zhen-Qing; Durrett, Richard; Ma, Gang. Holomorphic diffusions and boundary behavior of harmonic
 functions. Ann. Probab., Tome 25 (1997) no. 4, pp.  1103-1134. http://gdmltest.u-ga.fr/item/1024404507/