Improved L∞ bounds for eigenfunctions under random perturbations in negative curvature

Abstract

It has been known since the work of Avakumov\'ic, H\"ormander and Levitan that, on any compact smooth Riemannian manifold, if -g λ = λ λ, then \|λ\|L∞ ≤ C λd-14 \|λ\|L2. It is believed that, on manifolds of negative curvature, such a bound can be largely improved; however, only logarithmic improvements in λ have been obtained so far. In the present paper, we obtain polynomial improvements over the previous bound in a generic setting, by adding a small random pseudodifferential perturbation to the Laplace-Beltrami operator.