Type: Article
Publication Date: 2006-11-21
Citations: 19
DOI: https://doi.org/10.1090/s0002-9939-06-08597-2
We consider Dirichlet eigenfunctions $u_\lambda$ of the Bunimovich stadium $S$, satisfying $(\Delta - \lambda ^2) u_\lambda = 0$. Write $S = R \cup W$ where $R$ is the central rectangle and $W$ denotes the "wings," i.e., the two semicircular regions. It is a topic of current interest in quantum theory to know whether eigenfunctions can concentrate in $R$ as $\lambda \to \infty$. We obtain a lower bound $C \lambda ^{-2}$ on the $L^2$ mass of $u_\lambda$ in $W$, assuming that $u_\lambda$ itself is $L^2$-normalized; in other words, the $L^2$ norm of $u_\lambda$ is controlled by $\lambda ^2$ times the $L^2$ norm in $W$. Moreover, if $u_\lambda$ is an $o(\lambda ^{-2})$ quasimode, the same result holds, while for an $o(1)$ quasimode we prove that the $L^2$ norm of $u_\lambda$ is controlled by $\lambda ^4$ times the $L^2$ norm in $W$. We also show that the $L^2$ norm of $u_\lambda$ may be controlled by the integral of $w |\partial _N u|^2$ along $\partial S \cap W$, where $w$ is a smooth factor on $W$ vanishing at $R \cap W$. These results complement recent work of Burq-Zworski which shows that the $L^2$ norm of $u_\lambda$ is controlled by the $L^2$ norm in any pair of strips contained in $R$, but adjacent to $W$.