Classification of solutions to a weighted singular fractional problem in the half space

Abstract

We focus on the classification of positive solutions to (-)s u=xnαuγ in the half space with γ>0, subject to the Dirichlet condition. We show that when -2s<α<(γ-1)s, all positive solutions exhibit one-dimensional symmetry and are monotone increasing in xn. Moreover, we provide a complete classification of all such one-dimensional solutions via their ``asymptotic s-order slope". When α lies outside this range, we demonstrate the nonexistence of global positive solutions.