
handle: 2158/343745
Let be \(u\equiv 1\) on \({\bar \Omega}{}_ 1\), \(u=0\) on \(\partial \Omega_ 0\), \(\Omega_ 1\subset \subset \Omega_ 0\) and suppose that u satisfies \(\Delta u=f(x,u)\), \(0
radial symmetry, maximum principle, Nonlinear boundary value problems for linear elliptic equations, nonlinear Poisson equations, starshapedness, level sets, maximum principle; linee di livello; starshape; Poisson equation, capacitory problem, Maximum principles in context of PDEs
radial symmetry, maximum principle, Nonlinear boundary value problems for linear elliptic equations, nonlinear Poisson equations, starshapedness, level sets, maximum principle; linee di livello; starshape; Poisson equation, capacitory problem, Maximum principles in context of PDEs
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