Self-Similar Topological Fractals
Abstract
We introduce the notion of (abelian) similarity scheme, as a constructive model for topological self-similar fractals, in the same way in which the notion of iterated function system furnishes a constructive notion of self-similar fractals in a metric environment. At the same time, our notion gives a constructive approach to the Kigami-Kameyama notion of topological fractals, since a similarity scheme produces a topological fractal a la Kigami-Kameyama, and many Kigami-Kameyama topological fractals may be constructed via similarity schemes. Our scheme consists of objects X0→X1π← Y× X0, where X0,X1 and Y are compact Hausdorff spaces, the map is continuous injective and the map π is continuous surjective. This scheme produces a sequence Xn, n∈N, of compact Hausdorff spaces, Xn embedded in Xn+1, and a compact Hausdorff space X∞ giving a sort of injective limit space, which turns out to be self-similar. We observe that the space Y parametrizes the generalized similarity maps, and finiteness of Y is not required.
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