A Liouville theorem for α-harmonic functions in Rn+
Abstract
In this paper, we consider α-harmonic functions in the half space Rn+: equation \arrayll (-)α/2 u(x)=0,~u(x)>0, & x∈Rn+, \\ u(x) 0, & x Rn+. array. equation We prove that all the solutions have to assume the form equation u(x)=\arrayllCxnα/2, & x∈Rn+, \\ 0, & xn+, array. 2 equation for some positive constant C.
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