Stability and intersection properties of solutions to the nonlinear biharmonic equation

Paschalis Karageorgis

Stability and intersection properties of solutions to the nonlinear biharmonic equation

Analysis of PDEs 2007-07-25 v1

Authors: Paschalis Karageorgis

Abstract

We study the positive, regular, radially symmetric solutions to the nonlinear biharmonic equation $\Delta^2 \phi = \phi^p$ . First, we show that there exists a critical value $p_c$ , depending on the space dimension, such that the solutions are linearly unstable if $p<p_c$ and linearly stable if $p\geq p_c$ . Then, we focus on the supercritical case $p\geq p_c$ and we show that the graphs of no two solutions intersect one another.

Keywords

semilinear elliptic equations stability theory stability analysis

Cite

@article{arxiv.0707.3450,
  title  = {Stability and intersection properties of solutions to the nonlinear biharmonic equation},
  author = {Paschalis Karageorgis},
  journal= {arXiv preprint arXiv:0707.3450},
  year   = {2007}
}

Related papers

View all related →