Blow-up radial solutions for elliptic systems with monotonic non-linearities

Abstract

We are concerned with the existence and boundary behaviour of positive radial solutions for the system equation* \ aligned u&=g(|x|,v(x)) &&in\ , \\ v&=f(|x|,|∇ u(x)|) &&in\ , aligned . equation* where ⊂ RN is either a ball centered at the origin or the whole space RN, and f,g∈ C1([0,∞)× [0,∞)), are non-negative, and increasing. Firstly, we study the existence of positive radial solutions in the case when the system is posed in a ball corresponding to their behaviour at the boundary. Next, we discuss the existence of positive radial solutions in case when g(|x|,v(x)) = |x|a vp and f(|x|, |∇ u (x)|) = |x|b h(|∇ u|). Finally, we take h(t) = ts, s> 1, = RN and by the use of dynamical system techniques we are able to describe the behaviour at infinity of such positive radial solutions.

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