中文

Canonical self-affine tilings by iterated function systems

度量几何 2010-07-30 v2 动力系统 几何拓扑

摘要

An iterated function system Φ\Phi consisting of contractive similarity mappings has a unique attractor FRdF \subseteq \mathbb{R}^d which is invariant under the action of the system, as was shown by Hutchinson [Hut]. This paper shows how the action of the function system naturally produces a tiling T\mathcal{T} of the convex hull of the attractor. More precisely, it tiles the complement of the attractor within its convex hull. These tiles form a collection of sets whose geometry is typically much simpler than that of FF, yet retains key information about both FF and Φ\Phi. In particular, the tiles encode all the scaling data of Φ\Phi. We give the construction, along with some examples and applications. The tiling T\mathcal{T} is the foundation for the higher-dimensional extension of the theory of \emph{complex dimensions} which was developed for the case d=1d=1 in ``Fractal Geometry, Complex Dimensions, and Zeros of Zeta Functions,'' by Michel L. Lapidus and Machiel van Frankenhuijsen.

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引用

@article{arxiv.math/0606111,
  title  = {Canonical self-affine tilings by iterated function systems},
  author = {Erin P. J. Pearse},
  journal= {arXiv preprint arXiv:math/0606111},
  year   = {2010}
}

备注

16 pages, 8 figures, referee comments incorporated, new counterexample