Peano continua with self regenerating fractals

Abstract

We deal with the question of Masayoshi Hata: is every Peano continuum a topological fractal? A compact space X is a topological fractal if there exists F a finite family of self-maps on X such that X=f∈Ff(X) and for every open cover U of X there is n∈N such that for all maps f1,…,fn∈F the set f1… fn(X) is contained in some set U∈U. In the paper we present some idea how to extend a topological fractal and we show that a Peano continuum is a topological fractal if it contains so-called self regenerating fractal with nonempty interior. A Hausdorff topological space A is a self regenerating fractal if for every non-empty open subset U, A is a topological fractal for some family of maps constant on A U. The notion of self regenerating fractal much better reflects the intuitive perception of self-similarity. We present some classical fractals which are self regenerating.