Abstract :
We study existence of entire solutions of elliptic systems whose prototype is given by
div |u|γ |∇u|m−2∇u −
γ
m|u|γ−2u|∇u|m = |u|p−2u, u:Rn →RN,
withm>1, γ ∈ R, p >1. In particular, we prove that, if γ p −m, the system above admits a one
parameter family of nontrivial entire radial solutions, u = u(|x|), such that lim|x|→∞ |u(|x|)| =∞.
2004 Elsevier Inc. All rights reserved
