Bounds for quasimodes with polynomially narrow bandwidth on surfaces of revolution

Abstract

Given a compact surface of revolution with Laplace-beltrami operator , we consider the spectral projector Pλ,δ on a polynomially narrow frequency interval [λ-δ,λ + δ], which is associated to the self-adjoint operator -. For a large class of surfaces of revolution, and after excluding small disks around the poles, we prove that the L2 L∞ norm of Pλ,δ is of order λ12 δ12 up to δ ≥ λ-132. We adapt the microlocal approach introduced by Sogge for the case δ = 1, by using the Quantum Completely Integrable structure of surfaces of revolution introduced by Colin de Verdi\`ere. This reduces the analysis to a number of estimates of explicit oscillatory integrals, for which we introduce new quantitative tools.This is the first sharp result in the case δ 1 beyond the case of locally symmetric surfaces (torus, sphere, arithmetic hyperbolic surfaces).