Regionally proximal relation of order d along arithmetic progressions and nilsystems

Abstract

The regionally proximal relation of order d along arithmetic progressions, namely AP[d] for d∈ , is introduced and investigated. It turns out that if (X,T) is a topological dynamical system with AP[d]=, then each ergodic measure of (X,T) is isomorphic to a d-step pro-nilsystem, and thus (X,T) has zero entropy. Moreover, it is shown that if (X,T) is a strictly ergodic distal system with the property that the maximal topological and measurable d-step pro-nilsystems are isomorphic, then AP[d]= RP[d] for each d∈ N. It follows that for a minimal ∞-pro-nilsystem, AP[d]= RP[d] for each d∈ N. An example which is a strictly ergodic distal system with discrete spectrum whose maximal equicontinuous factor is not isomorphic to the Kronecker factor is constructed.