Group actions with discrete spectrum and their amorphic complexity
schedule le mardi 28 septembre 2021 de 10h30 à 12h00
Organisé par : Davd Burguet, Yves Coudene et Pierre-Antoine Guiheneuf
Intervenant : Maik Gröger (Cracovie)
Lieu : Salle 16-26-113
Sujet : Group actions with discrete spectrum and their amorphic complexity
Amorphic complexity, originally introduced for integer actions, is a topological invariant which measures the complexity of dynamical systems in the regime of zero entropy. We will introduce its definition for actions by locally compact sigma-compact amenable groups on compact metric spaces. Further, we will illustrate some of its basic properties and show why it is tailor-made to study strictly ergodic group actions with discrete spectrum and continuous eigenfunctions. This class of actions includes, in particular, Delone dynamical systems related to regular model sets obtained via cut and project schemes (CPS). Finally, for these kind of Delone dynamical systems we present sharp upper bounds on amorphic complexity utilizing basic properties of the corresponding CPS.
This is joint work with G. Fuhrmann, T. Jäger and D. Kwietniak.