Existence of Positive Radial Solutions of General Quasilinear Elliptic Systems

Abstract

Let ⊂ Rn\ (n≥2) be either an open ball BR centred at the origin or the whole space. We study the existence of positive, radial solutions of quasilinear elliptic systems of the form equation* \ aligned p u&=f1(|x|)g1(v)|∇ u|α && in , \\ p v&=f2(|x|)g2(v)h(|∇ u|) && in , aligned . equation* where α≥ 0, p is the p-Laplace operator, p>1, and for i,j=1,2 we assume fi,gj,h are continuous, non-negative and non-decreasing functions. For functions gj which grow polynomially, we prove sharp conditions for the existence of positive radial solutions which blow up at ∂ BR, and for the existence of global solutions.

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