Collage theorem

In mathematics, the collage theorem characterises an iterated function system whose attractor is close, relative to the Hausdorff metric, to a given set. The IFS described is composed of contractions whose images, as a collage or union when mapping the given set, are arbitrarily close to the given set. It is typically used in fractal compression.

Let ${\displaystyle \mathbb {X} }$ be a complete metric space. Let ${\displaystyle L\in H(\mathbb {X} )}$ be given, and let ${\displaystyle \epsilon \geq 0}$ be given. Choose an iterated function system (IFS) ${\displaystyle \{\mathbb {X} ;w_{1},w_{2},\dots ,w_{N}\}}$ with contractivity factor ${\displaystyle 0\leq s<1}$, so that

${\displaystyle h\left(L,\bigcup _{n=1}^{N}w_{n}(L)\right)\leq \varepsilon ,}$

where ${\displaystyle h(d)}$ is the Hausdorff metric. Then

${\displaystyle h(L,A)\leq {\frac {\varepsilon }{1-s}}}$

where A is the attractor of the IFS.

• Michael Barnsley

• Barnsley, Michael. (1988). Fractals Everywhere. Academic Press, Inc. ISBN 0-12-079062-9.

• A description of the collage theorem and interactive Java applet at cut-the-knot.
• Notes on designing IFSs to approximate real images. ^{[dead link]}
• Expository Paper on Fractals and Collage theorem

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