Unique Continuation for Quasimodes on Surfaces of Revolution: Rotationally invariant Neighbourhoods

Abstract

We prove a strong conditional unique continuation estimate for irreducible quasimodes in rotationally invariant neighbourhoods on compact surfaces of revolution. The estimate states that Laplace quasimodes which cannot be decomposed as a sum of other quasimodes have L2 mass bounded below by Cε λ-1 - ε for any ε>0 on any open rotationally invariant neighbourhood which meets the semiclassical wavefront set of the quasimode. For an analytic manifold, we conclude the same estimate with a lower bound of Cδ λ-1 + δ for some fixed δ>0.