Partially overdetermined problem in some integral equations (Q2845457)

The authors study the partially overdetermined problem in integral equations as NEWLINE\[NEWLINE \begin{cases} u(x)=\int_\Omega\frac{1}{|x-y|^{n-\alpha}}u^p(y)dy+B, & x\in \Omega, \\ u>0, & x\in \Omega,\\ u=C, & x\in\Gamma\subseteq\partial\Omega, \end{cases} NEWLINE\]NEWLINE where \(0<\alpha<n\), \(p>\frac{n}{n-\alpha}\), \(A,B,C\) are positive constants, \(\Omega\subset \mathbb R^n\) \((n\geq 2)\) is a bounded domain with \(\partial\Omega\in C^1\), and \(\Gamma\) a proper open set of \(\partial\Omega\). Under some assumptions on the geometry of \(\Gamma\), they prove that \(\Omega\) must be a ball and \(u\) is radially symmetric and monotone decreasing with respect to the radius.