Rigidity results for stable solutions of symmetric systems
arXiv:1410.1831
Abstract
We study stable solutions of the following nonlinear system $$ -Îu = H(u) \quad \text{in} \ \ Ω$$ where $u:\mathbb R^n\to \mathbb R^m$, $H:\mathbb R^m\to \mathbb R^m$ and $Ω$ is a domain in $\mathbb R^n$. We introduce the novel notion of symmetric systems. The above system is said to be symmetric if the matrix of gradient of all components of $H$ is symmetric. It seems that this concept is crucial to prove Liouville theorems, when $Ω=\mathbb R^n$, and regularity results, when $Ω=B_1$, for stable solutions of the above system for a general nonlinearity $H \in C^1(\mathbb R ^m)$. Moreover, we provide an improvement for a linear Liouville theorem given in [20] that is a key tool to establish De Giorgi type results in lower dimensions for elliptic equations and systems.
To appear in Proc. Amer. Math. Soc. 15 pages. Comments are welcome. See http://www.math.ualberta.ca/~fazly/research.html for updates