Some Liouville theorems for the fractional Laplacian

Abstract

In this paper, we prove the following result. Let α be any real number between 0 and 2. Assume that u is a solution of \arrayll (-)α/2 u(x) = 0 , \;\; x ∈ Rn ,\\ |x| ∞ u(x)|x|γ ≥ 0 , array . for some 0 ≤ γ ≤ 1 and γ < α. Then u must be constant throughout Rn. This is a Liouville Theorem for α-harmonic functions under a much weaker condition. For this theorem we have two different proofs by using two different methods: One is a direct approach using potential theory. The other is by Fourier analysis as a corollary of the fact that the only α-harmonic functions are affine.