On the growth of eigenfunction averages: microlocalization and geometry

Abstract

Let (M,g) be a smooth, compact Riemannian manifold and \φh\ an L2-normalized sequence of Laplace eigenfunctions, -h2gφh=φh. Given a smooth submanifold H ⊂ M of codimension k≥ 1, we find conditions on the pair (\φh\,H) for which |∫HφhdσH|=o(h1-k2), h 0+. One such condition is that the set of conormal directions to H that are recurrent has measure 0. In particular, we show that the upper bound holds for any H if (M,g) is surface with Anosov geodesic flow or a manifold of constant negative curvature. The results are obtained by characterizing the behavior of the defect measures of eigenfunctions with maximal averages.