On the asymptotic behavior of radial entire solutions for the equation $(-\Delta)^3 u=u^p$ in $\mathbf{R}^n$

Tien Tai Nguyen

On the asymptotic behavior of radial entire solutions for the equation (-)3 u=up in Rn

Abstract

Our main task in this note is to prove the existence and to classify the exact growth at infinity of radial positive C6-solutions of (- )3 u = up in Rn, where n≥slant 15 and p is bounded from below by the sixth-order Joseph-Lundgren exponent. Following the main work of Winkler, we introduce the sub- and super-solution method and comparision principle to conclude the asymptotic behavior of solutions.

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