Symmetry results in the half space for a semi-linear fractional Laplace equation through a one-dimensional analysis
Abstract
In this paper we analyze the semi-linear fractional Laplace equation (-)s u = f(u) in RN+, u=0 in RN RN+, where RN+=\x=(x',xN)∈ RN:\ xN>0\ stands for the half-space and f is a locally Lipschitz nonlinearity. We completely characterize one-dimensional bounded solutions of this problem, and we prove among other things that if u is a bounded solution with :=RNu verifying f()=0, then u is necessarily one-dimensional.
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