Singular semilinear elliptic equations in half-spaces
Abstract
We prove the monotonicity of positive solutions to the problem - u = f(u) in RN+ := \(x',xN)∈RN xN>0 \ under zero Dirichlet boundary condition with a possible singular nonlinearity f. In some situations, we can derive a precise estimate on the blow-up rate of ∂ u∂η as xN 0+, where (η,eN)>0, and obtain a classification result. The main tools we use are the method of moving planes and the sliding method.
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