Critical Exponent Elliptic Equations on the Half-Space: Uniqueness and Explicit Solutions
Abstract
We prove that all positive solutions of - u = u2nn-2 on the upper half space Rn+ (for n ≥ 3) satisfying the boundary condition Dxnu = -unn-2 are of the form u(x) = a ( λλ2 + |x-y|2 )n-22, where a = a(n), λ > 0, and y = (y1, …, yn) is a point in the lower half-space with yn < 0.
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