On acylindrical tree actions and outer automorphism group of Baumslag-Solitar groups

This paper explores acylindrical actions on trees, building on previous works related to mapping class groups and projection complexes. We demonstrate that the quotient action of an acylindrical action of a group on a tree by an equivariant family of subgroups remains acylindrical. We establish criteria for ensuring that this quotient action is non-elementary acylindrical, thus preserving acylindrical hyperbolicity of the group. Additionally, we show that the fundamental group of a graph of groups admits the largest acylindrical action on its Bass-Serre tree under certain conditions. As an application, we analyze the outer automorphism group of non-solvable Baumslag-Solitar groups, we prove its acylindrical hyperbolicity, highlighting the differences between various tree actions and identifying the largest acylindrical action.