Attractor and its self-similarities for an IFS over arbitrary sub-shift

Abstract

Consider a compact metric space X, and let F=\f1,\,f2,…,\, fk\ be a set of contracting and continuous self maps on X. Let be a sub-shift on k symbols, and let k be the full shift. Define Ln() as the set of words of length n in . For u=u1·s un∈ Ln(), set fu:=fun·s fu1 and Hn(·):=u ∈ Ln(k) fu(·). When =k, Hn(·) is the nth iteration of the Hutchinson's operator, and there exists a compact set S= n → ∞ Hn(A) for any compact A⊂eq X with Hn(S)=S (self-similarity criteria) for n∈. For arbitrary , the above limit exists; but it is not necessarily true that Hn(S)=S. Sufficient conditions on are provided to have Hn(S)=S for all or some n∈, and then the dynamics of S under the admissible iterations of fi's defined by are investigated.