On a kind of self-similar sets with complete overlaps

Abstract

Let E be the self-similar set generated by the iterated function system \[ f0(x)=xβ, f1(x)=x+1β, fβ+1=x+β+1β \]with β 3. Then E is a self-similar set with complete overlaps, i.e., f0 fβ+1=f1 f1, but E is not totally self-similar. We investigate all its generating iterated function systems, give the spectrum of E, and determine the Hausdorff dimension and Hausdorff measure of E and of the sets which contain all points in E having finite or infinite different triadic codings.