Eigenfunction concentration via geodesic beams

Abstract

In this article we develop new techniques for studying concentration of Laplace eigenfunctions φλ as their frequency, λ, grows. The method consists of controlling φλ(x) by decomposing φλ into a superposition of geodesic beams that run through the point x. Each beam is localized in phase-space on a tube centered around a geodesic whose radius shrinks slightly slower than λ-12. We control φλ(x) by the L2-mass of φλ on each geodesic tube and derive a purely dynamical statement through which φλ(x) can be studied. In particular, we obtain estimates on φλ(x) by decomposing the set of geodesic tubes into those that are non self-looping for time T and those that are. This approach allows for quantitative improvements, in terms of T, on the available bounds for L∞ norms, Lp norms, pointwise Weyl laws, and averages over submanifolds.