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DNA
2009
Springer
2009
Springer
Self-assembly of the Discrete Sierpinski Carpet and Related Fractals
It is well known that the discrete Sierpinski triangle can be defined as the nonzero residues modulo 2 of Pascal’s triangle, and that from this definition one can easily construct a tileset with which the discrete Sierpinski triangle self-assembles in Winfree’s tile assembly model. In this paper we introduce an infinite class of discrete self-similar fractals that are defined by the residues modulo a prime p of the entries in a twodimensional matrix obtained from a simple recursive equation. We prove that every fractal in this class self-assembles using a uniformly constructed tileset. As a special case we show that the discrete Sierpinski carpet self-assembles using a set of 30 tiles.
Real-time TrafficComputational Biology | Discrete Self-similar Fractals | Discrete Sierpinski Triangle | DNA 2009 | Sierpinski Triangle Self-assembles |
| Added | 26 May 2010 |
| Updated | 26 May 2010 |
| Type | Conference |
| Year | 2009 |
| Where | DNA |
| Authors | Steven M. Kautz, James I. Lathrop |
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