Classification of radial solutions for elliptic systems driven by the k-Hessian operator

Abstract

We are concerned with non-constant positive radial solutions of the system \ aligned Sk(D2 u)&=|∇ u|m vp&& in ,\\ Sk(D2 v)&=|∇ u|q vs && in , aligned . where Sk(D2u) is the k-Hessian operator of u∈ C2() (1≤ k≤ N) and ⊂RN (N≥ 2) is either a ball or the whole space. The exponents satisfy q>0, m,s≥ 0, p≥ s≥ 0 and (k-m)(k-s)≠ pq. In the case where is a ball, we classify all the positive radial solutions according to their behavior at the boundary. Further, we consider the case =RN and find that the above system admits non-constant positive radial solutions if and only if 0≤ m<k and pq < (k-m)(k-s). Using arguments from three component cooperative and irreducible dynamical systems we deduce the behavior at infinity of such solutions.