The \(C^{1,1}\) regularity of the pluricomplex Green function (Q5954525)

For a domain \(\Omega\subset\mathbb C^n\) and a point \(\zeta\in\Omega\), let \(g=g_\Omega(\zeta,\cdot)\) be the pluricomplex Green function for \(\Omega\) with pole at \(\zeta\). NEWLINENEWLINENEWLINEThe author studies the regularity of \(g\) on \(\overline\Omega\setminus\{\zeta\}\). He proves the following two theorems. (1) If \(\Omega\) is strictly pseudoconvex, then \(g\in\mathcal C^{1,1}(\overline\Omega\setminus\{\zeta\})\) (it was known that \(g\) need not be \(\mathcal C^2(\overline\Omega\setminus\{\zeta\})\)). (2) If \(\Omega\) is a bounded hyperconvex domain, then \(g\in\mathcal C^{0,1}(\overline\Omega\setminus\{\zeta\})\) iff there exist \(\psi\in\mathcal{PSH}(\Omega)\) and \(C>0\) such that \(-C\text{dist}(z,\partial\Omega)\leq\psi(z)<0\), \(z\in\Omega\).