Entire solutions of quasilinear differential equations corresponding to p-harmonic maps

In this paper we study positive solutions u(r) of the following differential equation

We study the existence of unbounded positive entire C2-solutions of the rotationally symmetric harmonic map equations. Using the existence result, we solve the Dirichlet problem at infinity for any nonnegative boundary value at infinity. (~) 1999 Elsevier Science Ltd. All rights reserved.

This is an attempt to establish a link between positive solutions of semilinear equations Lu=& (u) and Lv= (v) where L is a second order elliptic differential operator and is a positive function. The equations were investigated separately by a number of authors. We try to link them via positive solu

Let ~ and ]~ be positive solutions on (0, ~) to the rotationally symmetric p-harmonic map equation on model manifolds M(f) and M(ff), where f is assumed to he sufficiently large near infinity and g"(y) >1 0 for y>0. We show that if and fl have the same limit at infinity, then ~ -]~ on (0, o<~).