Boundary singularities of solutions of N-harmonic equations with absorption
Abstract
We study the boundary behaviour of solutions u of -Nu+ |u|q-1u=0 in a bounded smooth domain ⊂ RN subject to the boundary condition u=0 except at one point, in the range q>N-1. We prove that if q≥ 2N-1 such a u is identically zero, while, if N-1<q<2N-1, u inherits a boundary behaviour which either corresponds to a weak singularity, or to a strong singularity. Such singularities are effectively constructed.
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