Difference between revisions of "Self-Assembly of Discrete Self-Similar Fractals"

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discrete self-similar fractals has a fibered version that strictly self-assembles in the TAM.
 
discrete self-similar fractals has a fibered version that strictly self-assembles in the TAM.
 
|authors=Matthew J. Patitz and Scott M. Summers
 
|authors=Matthew J. Patitz and Scott M. Summers
 +
|date=2008/03/12
 
|file=[[media:SADSSF journal.pdf]]
 
|file=[[media:SADSSF journal.pdf]]
 
}}
 
}}

Revision as of 14:13, 23 January 2012

Published on: 2008/03/12

Abstract

In this paper, we search for theoretical limitations of the Tile Assembly Model (TAM), along with techniques to work around such limitations. Specifically, we investigate the self-assembly of fractal shapes in the TAM. We prove that no self-similar fractal weakly self-assembles at temperature 1 in a locally deterministic tile assembly system, and that certain kinds of discrete self-similar fractals do not strictly self-assemble at any temperature. Additionally, we extend the fiber construction of Lathrop, Lutz and Summers (2007) to show that any discrete self-similar fractal belonging to a particular class of "nice" discrete self-similar fractals has a fibered version that strictly self-assembles in the TAM.

Authors

Matthew J. Patitz and Scott M. Summers

File

media:SADSSF journal.pdf