Strong comparison principle for the fractional p-Laplacian and applications to starshaped rings

Abstract

In the following we show the strong comparison principle for the fractional p-Laplacian, i.e. we analyze functions v,w which satisfy v≥ w in RN and \[ (-)spv+q(x)|v|p-2v≥ (-)spw+q(x)|w|p-2w in D, \] where s∈(0,1), p>1, D⊂ RN is an open set, and q∈ L∞(RN) is a nonnegative function. Under suitable conditions on s,p and some regularity assumptions on v,w we show that either v w in RN or v>w in D. Moreover, we apply this result to analyze the geometry of nonnegative solutions in starshaped rings and in the half space.