Positive entropy using Hecke operators at a single place

Abstract

We prove the following statement: Let X=SLn(Z) SLn(R), and consider the standard action of the diagonal group A<SLn(R) on it. Let μ be an A-invariant probability measure on X, which is a limit μ=λi|φi|2dx, where φi are normalized eigenfunctions of the Hecke algebra at some fixed place p, and λ>0 is some positive constant. Then any regular element a∈ A acts on μ with positive entropy on almost every ergodic component. We also prove a similar result for lattices coming from division algebras over Q, and derive a quantum unique ergodicity result for the associated locally symmetric spaces. This generalizes a result of Brooks and Lindenstrauss.