Singular solutions for coercive quasilinear elliptic inequalities with nonlocal terms

Abstract

We study the inequality div(|x|-α|∇ u|m-2∇ u)≥ (Iβ up)uq in B1\0\⊂ RN, where α>0, N≥ 1, m>1, p, q>m-1 and Iβ denotes the Riesz potential of order β∈(0, N). We obtain sharp conditions in terms of these parameters for which positive singular solutions exist. We further establish the asymptotic profile of singular solutions to the double inequality a(Iβ up)uq≥ div(|x|-α|∇ u|m-2∇ u)≥ b(Iβ up)uq in B1\0\⊂ RN, where a≥ b>0 are constants.