Recent developments in mathematical Quantum Chaos

TL;DR

This survey reviews recent advances in quantum ergodicity, focusing on quantum unique ergodicity, entropy bounds, and specific counterexamples, highlighting new constraints and applications in quantum chaos.

Contribution

It compiles recent results on quantum limits, entropy bounds, and counterexamples, providing a comprehensive overview of developments in mathematical quantum chaos.

Findings

Lower bounds on entropies of quantum limit measures.

Existence of non-QUE eigenfunctions in certain billiard tables.

Applications to the geometry of nodal sets.

Abstract

This is a survey of recent results on quantum ergodicity, specifically on the large energy limits of matrix elements relative to eigenfunctions of the Laplacian. It is mainly devoted to QUE (quantum unique ergodicity) results, i.e. results on the possible existence of a sparse subsequence of eigenfunctions with anomalous concentration. We cover the lower bounds on entropies of quantum limit measures due to Anantharaman, Nonnenmacher, and Rivi\`ere on compact Riemannian manifolds with Anosov flow. These lower bounds give new constraints on the possible quantum limits. We also cover the non-QUE result of Hassell in the case of the Bunimovich stadium. We include some discussion of Hecke eigenfunctions and recent results of Soundararajan completing Lindenstrauss' QUE result, in the context of matrix elements for Fourier integral operators. Finally, in answer to the potential question `why study matrix elements' it presents an application of the author to the geometry of nodal sets.