Publikation: Dichotomy Results for Fixed Point Counting in Boolean Dynamical Systems
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2007
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Homan, Christopher M.
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ITALIANO, Giuseppe F., ed. and others. Proceedings of the 10th Italian Conference on Theoretical Computer Science. Singapore [u.a.]: World Scientific, 2007, pp. 163-174
Zusammenfassung
We present dichotomy theorems regarding the computational complexity of counting fixed points in boolean (discrete) dynamical systems, i.e., finite discrete dynamical systems over the domain {0,1}. For a class F of boolean functions and a class G of graphs, an (F,G)-system is a boolean dynamical system with local transitions functions lying in F and graphs in G. We show that, if local transition functions are given by lookup tables, then the following complexity classification holds: Let F be a class of boolean functions closed under superposition and let G be a graph class closed under taking minors. If F contains all min-functions, all max-functions, or all self-dual and monotone functions, and G contains all planar graphs, then it is #P-complete to compute the number of fixed points in an (F,G)-system; otherwise it is computable in polynomial time. We also prove a dichotomy theorem for the case that local transition functions are given by formulas (over logical bases). This theorem has a significantly more complicated structure than the theorem for lookup tables. A corresponding theorem for boolean circuits coincides with the theorem for formulas.
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ICTCS, 3. Okt. 2007 - 5. Okt. 2007, Rome, Italy
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KOSUB, Sven, Christopher M. HOMAN, 2007. Dichotomy Results for Fixed Point Counting in Boolean Dynamical Systems. ICTCS. Rome, Italy, 3. Okt. 2007 - 5. Okt. 2007. In: ITALIANO, Giuseppe F., ed. and others. Proceedings of the 10th Italian Conference on Theoretical Computer Science. Singapore [u.a.]: World Scientific, 2007, pp. 163-174BibTex
@inproceedings{Kosub2007Dicho-3057,
year={2007},
title={Dichotomy Results for Fixed Point Counting in Boolean Dynamical Systems},
publisher={World Scientific},
address={Singapore [u.a.]},
booktitle={Proceedings of the 10th Italian Conference on Theoretical Computer Science},
pages={163--174},
editor={Italiano, Giuseppe F.},
author={Kosub, Sven and Homan, Christopher M.}
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<dcterms:abstract xml:lang="eng">We present dichotomy theorems regarding the computational complexity of counting fixed points in boolean (discrete) dynamical systems, i.e., finite discrete dynamical systems over the domain {0,1}. For a class F of boolean functions and a class G of graphs, an (F,G)-system is a boolean dynamical system with local transitions functions lying in F and graphs in G. We show that, if local transition functions are given by lookup tables, then the following complexity classification holds: Let F be a class of boolean functions closed under superposition and let G be a graph class closed under taking minors. If F contains all min-functions, all max-functions, or all self-dual and monotone functions, and G contains all planar graphs, then it is #P-complete to compute the number of fixed points in an (F,G)-system; otherwise it is computable in polynomial time. We also prove a dichotomy theorem for the case that local transition functions are given by formulas (over logical bases). This theorem has a significantly more complicated structure than the theorem for lookup tables. A corresponding theorem for boolean circuits coincides with the theorem for formulas.</dcterms:abstract>
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