A non-concentration estimate for partially rectangular billiards
Abstract
We consider quasimodes on planar domains with a partially rectangular boundary. We prove that for any ε0>0, an (λ-ε0) quasimode must have L2 mass in the "wings" bounded below by λ-2-δ for any δ>0. The proof uses the author's recent work on 0-Gevrey smooth domains to approximate quasimodes on C1,1 domains. There is an improvement for C2,α domains.
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