Groups Acting on Trees With Prescribed Local Action

Abstract

We extend Burger--Mozes theory of closed, non-discrete, locally quasiprimitive automorphism groups of locally finite, connected graphs to the semiprimitive case, and develop a generalization of Burger--Mozes universal groups acting on the regular tree Td of degree d∈N 3. Three applications are given: First, we characterize the automorphism types which the quasi-center of a non-discrete subgroup of Aut(Td) may feature in terms of the group's local~action. In doing so, we explicitly construct closed, non-discrete, compactly generated subgroups of Aut(Td) with non-trivial quasi-center, and see that Burger--Mozes theory does not extend further to the transitive case. We then characterize the (Pk)-closures of locally transitive subgroups of Aut(Td) containing an involutive inversion, and thereby partially answer two questions by Banks--Elder--Willis. Finally, we offer a new view on the Weiss conjecture.