Monotonicity of solutions for some nonlocal elliptic problems in half-spaces

Abstract

In this paper we consider classical solutions u of the semilinear fractional problem (-)s u = f(u) in RN+ with u=0 in RN RN+, where (-)s, 0<s<1, stands for the fractional laplacian, N 2, RN+=\x=(x',xN)∈ RN:\ xN>0\ is the half-space and f∈ C1 is a given function. With no additional restriction on the function f, we show that bounded, nonnegative, nontrivial classical solutions are indeed positive in RN+ and verify ∂ u∂ xN>0 in RN+. This is in contrast with previously known results for the local case s=1, where nonnegative solutions which are not positive do exist and the monotonicity property above is not known to hold in general even for positive solutions when f(0)<0.