Stability of entire solutions to supercritical elliptic problems involving advection

Abstract

We examine the equation given by equation eqabstract - u + a(x) · ∇ u = up in N, equation where p>1 and a(x) is a smooth vector field satisfying some decay conditions. We show that for p < pc, the Joseph-Lundgren exponent, that there is no positive stable solution of (eqabstract) provided one imposes a smallness condition on a along with a divergence free condition. In the other direction we show that for N 4 and p > N-1N-3 there exists a positive solution of (eqabstract) provided a satisfies a smallness condition. For p>pc we show the existence of a positive stable solution of (eqabstract) provided a is divergence free and satisfies a smallness condition.