On stable entire solutions of semi-linear elliptic equations with weights

Abstract

We are interested in the existence versus non-existence of non-trivial stable sub- and super-solutions of equation pop -div(ω1 ∇ u) = ω2 f(u) in\ \ N, equation with positive smooth weights ω1(x),ω2(x). We consider the cases f(u) = eu, up where p>1 and -u-p where p>0. We obtain various non-existence results which depend on the dimension N and also on p and the behaviour of ω1,ω2 near infinity. Also the monotonicity of ω1 is involved in some results. Our methods here are the methods developed by Farina, f2. We examine a specific class of weights ω1(x) = (|x|2 +1)α2 and ω2(x) = (|x|2+1)β2 g(x) where g(x) is a positive function with a finite limit at ∞. For this class of weights non-existence results are optimal. To show the optimality we use various generalized Hardy inequalities.