English

On a general SU(3) Toda System

Analysis of PDEs 2014-07-29 v1

Abstract

We study the following generalized SU(3)SU(3) Toda System {Δu=2eu+μev in R2Δv=2ev+μeu in R2R2eu<+, R2ev<+ \left\{\begin{array}{ll} -\Delta u=2e^u+\mu e^v & \hbox{ in }\R^2\\ -\Delta v=2e^v+\mu e^u & \hbox{ in }\R^2\\ \int_{\R^2}e^u<+\infty,\ \int_{\R^2}e^v<+\infty \end{array}\right. where μ>2\mu>-2. We prove the existence of radial solutions bifurcating from the radial solution (log64(2+μ)(8+x2)2,log64(2+μ)(8+x2)2)(\log \frac{64}{(2+\mu) (8+|x|^2)^2}, \log \frac{64}{ (2+\mu) (8+|x|^2)^2}) at the values μ=μn=22nn22+n+n2, nN\mu=\mu_n=2\frac{2-n-n^2}{2+n+n^2},\ n\in\N .

Cite

@article{arxiv.1407.7217,
  title  = {On a general SU(3) Toda System},
  author = {Francesca Gladiali and Massimo Grossi and Jun-cheng Wei},
  journal= {arXiv preprint arXiv:1407.7217},
  year   = {2014}
}
R2 v1 2026-06-22T05:14:11.578Z