Litcius/Paper detail

The structure of mean equicontinuous group actions

Gabriel Fuhrmann, Maik Gröger, Daniel Lenz

2022Israel Journal of Mathematics34 citationsDOIOpen Access PDF

Abstract

Abstract We study mean equicontinuous actions of locally compact σ-compact amenable groups on compact metric spaces. In this setting, we establish the equivalence of mean equicontinuity and topo-isomorphy to the maximal equicontinuous factor and provide a characterization of mean equicontinuity of an action via properties of its product. This characterization enables us to show the equivalence of mean equicontinuity and the weaker notion of Besicovitch-mean equicontinuity in fairly high generality, including actions of abelian groups as well as minimal actions of general groups. In the minimal case, we further conclude that mean equicontinuity is equivalent to discrete spectrum with continuous eigenfunctions. Applications of our results yield a new class of non-abelian mean equicontinuous examples as well as a characterization of those extensions of mean equicontinuous actions which are still mean equicontinuous.

Topics & Concepts

EquicontinuityMathematicsAbelian groupEquivalence (formal languages)Characterization (materials science)Pure mathematicsDiscrete mathematicsNanotechnologyMaterials scienceAdvanced Topology and Set TheoryMathematical Dynamics and FractalsFunctional Equations Stability Results