A Spectral Strong Approximation Theorem for Measure Preserving Actions
arXiv:1412.4814
Abstract
Let $Î$ be a finitely generated group acting by probability measure preserving maps on the standard Borel space $(X,μ)$. We show that if $H\leqÎ$ is a subgroup with relative spectral radius greater than the global spectral radius of the action, then $H$ acts with finitely many ergodic components and spectral gap on $(X,μ)$. This answers a question of Shalom who proved this for normal subgroups.
17 pages