Mean of the L∞-norm for L2-normalized random waves on compact aperiodic Riemannian manifolds

Abstract

This article concerns upper bounds for L∞-norms of random approximate eigenfunctions of the Laplace operator on a compact aperiodic Riemannian manifold (M,g). We study fλ chosen uniformly at random from the space of L2-normalized linear combinations of Laplace eigenfunctions with eigenvalues in the interval (λ2, λ+12]. Our main result is that the expected value of fλ∞ grows at most like C λ as λ ∞, where C is an explicit constant depending only on the dimension and volume of (M,g). In addition, we obtain concentration of the L∞-norm around its mean and median and study the analogous problems for Gaussian random waves on (M,g).