Random β-transformation on fat Sierpinski gasket

Abstract

We consider the iterated function system (IFS) fq(z)=z+qβ,q∈\(0,0),(1,0),(0,1)\. As is well known, for β = 2 the attractor, Sβ, is a fractal called the Sierpi\'nski gasket(or sieve) and for β>2 it is also a fractal. Our goal is to study greedy, lazy and random β-transformations on the attractor for this IFS with 1<β<2. For 1<β≤ 3/2, Sβ is a triangle and it is shown that the greedy transformation Tβ and the lazy transformation Lβ are isomorphic and they both admit an absolutely continuous invariant measure. We show that all β-expansions of a point z in Sβ can be generated by a random map Kβ defined on \0,1\N×\0,1,2\N× Sβ and Kβ has a unique invariant measure of maximal entropy when 1<β≤β*, where β*≈ 1.4656 is the root of x3-x2-1=0. We also show existence of a Kβ-invariant probability measure, absolutely continuous with respect to m1 m2 λ2, where m1, m2 are product measures on \0,1\N,\0,1,2\N, respectively, and λ2 is the normalized Lebesgue measure on Sβ. For 3/2<β≤ β*, where β*≈ 1.5437 is the root of x3-2x2+2x=2, there are radial holes in Sβ. In this case, Kβ is defined on \0,1\N× Sβ. We also show that it has a unique invariant measure of maximal entropy.