Eigenfunction concentration for polygonal billiards

Abstract

In this note, we extend the results on eigenfunction concentration in billiards as proved by the third author in M1. There, the methods developed in Burq-Zworski BZ3 to study eigenfunctions for billiards which have rectangular components were applied. Here we take an arbitrary polygonal billiard B and show that eigenfunction mass cannot concentrate away from the vertices; in other words, given any neighbourhood U of the vertices, there is a lower bound ∫U |u|2 ≥ c ∫B |u|2 for some c = c(U) > 0 and any eigenfunction u.