I am looking for (minimal) conditions, which guarantee that the problem
Lu = 0 in R^n,
where L is a second-order (uniformly) elliptic operator with analytic coefficients, has a unique global analytic solution. Does anybody have any references to relevant work?
When $L$ has analytic coefficients, any solution of $Lu=0$ in $\mathbb{R}^n$ is automatically analytic. You should be asking about conditions guaranteeing that the only solution of this equation is $u=0$. For example, if you assume that $u(x)\to 0$ as $|x|\to \infty$, then the maximum principle will do the trick. For more refined results you could try a Gooogle search or a MathSciNet search.
