A microlocal approach to eigenfunction concentration

Abstract

We describe a new approach to understanding averages of high energy Laplace eigenfunctions, uh, over submanifolds, |∫ H uhdσH| where H⊂ M is a submanifold and σH the induced by the Riemannian metric on M. This approach can be applied uniformly to submanifolds of codimension 1≤ k≤ n and in particular, gives a new approach to understanding \|uh\|L∞(M). The method, developed in the author's recent work together with Y. Canzani and J. Toth, relies on estimating averages by the behavior of uh microlocally near the conormal bundle to H. By doing this, we are able to obtain quantitative improvements on eigenfunction averages under certain uniform non-recurrent conditions on the conormal directions to H. In particular, we do not require any global assumptions on the manifold (M,g).