Monotonic convergence of positive radial solutions for general quasilinear elliptic systems

Abstract

We study the asymptotic behavior of positive radial solutions for quasilinear elliptic systems that have the form equation* \ aligned p u &= c1|x|m1 · g1(v) · |∇ u|α & in Rn,\\ p v &= c2|x|m2 · g2(v) · g3(|∇ u|) & in Rn, aligned . equation* where p denotes the p-Laplace operator, p>1, n≥ 2, c1,c2>0 and m1, m2, α ≥ 0. For a general class of functions gj which grow polynomially, we show that every non-constant positive radial solution (u,v) asymptotically approaches (u0,v0) = (Cλ |x|λ, Cμ |x|μ) for some parameters λ,μ, Cλ, Cμ>0. In fact, the convergence is monotonic in the sense that both u/u0 and v/v0 are decreasing. We also obtain similar results for more general systems.