Semiclassical Measures for Complex Hyperbolic Quotients

Author(s)

Athreya, Jayadev; Dyatlov, Semyon; Miller, Nicholas

Abstract

We study semiclassical measures for Laplacian eigenfunctions on compact complex hyperbolic quotients. Geodesic flows on these quotients are a model case of hyperbolic dynamical systems with different expansion/contraction rates in different directions. We show that the support of any semiclassical measure is either equal to the entire cosphere bundle or contains the cosphere bundle of a compact immersed totally geodesic complex submanifold. The proof uses the one-dimensional fractal uncertainty principle of Bourgain–Dyatlov (Ann. Math. (2) 187(3):825–867, 2018) along the fast expanding/contracting directions, in a way similar to the work of Dyatlov–Jézéquel (Ann. Henri Poincaré, 2023) in the toy model of quantum cat maps, together with a description of the closures of fast unstable/stable trajectories relying on Ratner theory.

Date issued

2025-08-28

URI

https://hdl.handle.net/1721.1/163798

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Geometric and Functional Analysis

Publisher

Springer International Publishing

Citation

Athreya, J., Dyatlov, S. & Miller, N. Semiclassical Measures for Complex Hyperbolic Quotients. Geom. Funct. Anal. 35, 979–1050 (2025).

Version: Author's final manuscript