In the 90s, Nebbia conjectured that a group of tree automorphisms acting transitively on the tree’s boundary must be of type I, that is, its unitary representations can in principal be classified. For key examples, such as Burger-Mozes groups, this conjecture is verified. Aiming for a better understanding of Nebbia’s conjecture and a better understanding of representation theory of groups acting on trees, it is natural to ask whether there is a characterization of type I groups acting on trees. In 2016, we introduced in collaboration with Cyril Houdayer a refinement of Nebbia’s conjecture to a trichotomy, opposing type I groups with groups whose von Neumann algebra is non-amenable. For large classes of groups, including Burger-Mozes groups, we could verify this trichotomy.
In this talk, I will motivate and introduce the conjecture trichotomy for groups acting on tress and explain how von Neumann algebraic techniques enter the picture.
This video was produced by Newcastle University, Australia, as part of the Symmetries in Newcastle seminar series.
