Maximal solutions of equation u = uq in arbitrary domains
Abstract
We prove bilateral capacitary estimates for the maximal solution UF of - u+uq=0 in the complement of an arbitrary closed set F⊂ RN, involving the Bessel capacity C2,q', for q in the supercritical range q≥ qc:=N/(N-2). We derive a pointwise necessary and sufficient condition, via a Wiener type criterion, in order that UF(x)∞ as x y for given y∈ F. Finally we prove a general uniqueness result for large solutions.
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