Radially symmetric solutions of the \(p\)-Laplacian in perforated-like domain with nonlocal boundary condition (Q1763987)

Radially symmetric solutions are considered of the \(p\)-Laplacian equation with some source subjected to nonlocal boundary conditions. The problem can be written in the form \[ (r^{N-1}\phi_p(u'))'+r^{N-1}h(r) f(u)=0,\quad r\in(0,1), \] \[ \phi_p(u'(1))=\int^1_0 s^{N-1} \phi_p(u'(s))\,dg(s), \] with \(\phi_p(s)=| s|^{p-2}s\). An additional limit boundary condition at \(r=+0\) can also be imposed. Sufficient conditions for existence, nonexistence, and uniqueness of the solution are obtained.