The universal group of Burger--Mozes and the Howe--Moore property

Abstract

By constructing a new unitary representation we prove the universal group U(F)+ of Burger--Mozes does not have the Howe--Moore property when F is primitive but not 2-transitive. It is well known U(F)+ does have this property when F is 2-transitive. Along the way, we give a characterization of the universal group, when F is primitive, to have the Howe--Moore property, and also prove U(F)+ has the relative Howe--Moore property. These two results are a consequence of a strengthening of Mautner's phenomenon for locally compact groups acting on d-regular trees and having Tits' independence property.