Directional bounded complexity, mean equicontinuity and discrete spectrum for Zq-actions

Abstract

Given q∈N, let (X,T) be a Zq-system, v∈Rq\0\ be a direction vector and b∈R+q-1. We study (X,T) that has bounded complexity with respect to three kinds of metrics defined along direction v: the directional Bowen metric dkv,b, the directional max-mean metric dkv,b and the directional mean metric dkv,b. It is shown that (X,T) has bounded topological complexity with respect to \dkv,b\k=1∞ (resp. \dkv,b\k=1∞) if and only if T is (v,b)-equicontinuous (resp. (v,b)-equicontinuous in the mean). Meanwhile, it turns out that an invariant Borel probability measure μ on X has bounded complexity with respect to \dkv,b\k=1∞ if and only if T is (μ,v,b)-equicontinuous. Moreover, it is shown that μ has bounded complexity with respect to \dkv,b\k=1∞ if and only if μ has bounded complexity with respect to \dkv,b\k=1∞ if and only if T is (μ,v,b)-mean equicontinuous if and only if T is (μ,v,b)-equicontinuous in the mean if and only if μ has v-discrete spectrum.