Equivalence between radial solutions of different non-homogeneous p-Laplacian type equations

Abstract

We study radial viscosity solutions to the equation \[ -\ |Du\ |q-2pNu=f(\ |x\ |) BR⊂RN, \] where f∈ C[0,R), p,q∈(1,∞) and N≥2. Our main result is that u(x)=v(\ |x\ |) is a bounded viscosity supersolution if and only if v is a bounded weak supersolution to -qdv=f in (0,R), where >0 and qd is heuristically speaking the radial q-Laplacian in a fictitious dimension d. As a corollary we obtain the uniqueness of radial viscosity solutions. However, the full uniqueness of solutions remains an open problem.