Weighted Robin eigenvalue problems and nonlinear elliptic equations with general growth in the gradient
Abstract
We prove an existence result for Robin boundary value problems modeled on \[ cases u + |∇ u|2 + λ f(x) = 0 & in \\ ∂ u∂ + β u = 0 & on ∂ cases \] where is a bounded, sufficiently smooth open set in RN, f(x) belongs to the Marcinkiewicz space M N2 and β>0, under a smallness assumption on the datum λ. In order to study such problem, we will show several properties of the weighted, singular Robin eigenvalue problem \[ λ1,f,γ()= ∈f∈ H1,\;∫f2=1\∫|∇ |2dx+γ∫∂2\. \]
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