Chacon's Type Ergodic Transformations with Unbounded Arithmetic Spacers

Abstract

The following generalizations of the Chacon map are proposed: instead of classical constant spacer sequence (0,1,0) let a sequence (0,sj,0) be one with unbounded sj. (We mention also an analogue of the historical Chacon map with spacer sequences in the form (0,sj).) This narrow class of rank-one transformations may be abundant source of open questions. All such constructions have partial rigidity, but some other properties could be different. For root sequence, sj= [j], (or sj= [j]) the corresponding action is rigid, moreover it possesses all polynomials in its weak closure. In the linear case sj=j we get (as well as for the classical Chacon transformation) the property of minimal self-joinings (MSJ). We present some observations about MSJ, mild mixing, partial mixing, -mixing, absence of factors, triviality of centralizer and spectral primality, state several problems, and mention exponential "self-similar" Chacon transformations and flows on infinite measure spaces.