Abstract
This paper characterizes the attractor structure of synchronous and asynchronous Boolean networks induced by bi-threshold functions. Bi-threshold functions are generalizations of standard threshold functions and have separate threshold values for the transitions 0 → 1 (up-threshold) and 1 → 0 (down-threshold). We show that synchronous bi-threshold systems may, just like standard threshold systems, only have fixed points and 2-cycles as attractors. Asynchronous bi-threshold systems (fixed permutation update sequence), on the other hand, undergo a bifurcation. When the difference ∆ of the down- and up-threshold is less than 2 they only have fixed points as limit sets. However, for ∆ ≥ 2 they may have long periodic orbits. The limiting case of ∆ = 2 is identified using a potential function argument. Finally, we present a series of results on the dynamics of bi-threshold systems for families of graphs.
| Original language | English |
|---|---|
| Pages (from-to) | 29-46 |
| Number of pages | 18 |
| Journal | Discrete Mathematics and Theoretical Computer Science |
| Volume | AP |
| State | Published - 2012 |
| Event | 17th International Workshop on Cellular Automata and Discrete Complex Systems, AUTOMATA 2011 - Santiago, Chile Duration: Nov 21 2011 → Nov 23 2011 |
Bibliographical note
Publisher Copyright:© 2012 Discrete Mathematics and Theoretical Computer Science (DMTCS), Nancy, France.
Keywords
- asynchronous
- bi-threshold
- bifurcation
- Boolean networks
- graph dynamical systems
- sequential dynamical systems
- synchronous
- threshold
ASJC Scopus subject areas
- Theoretical Computer Science
- General Computer Science
- Discrete Mathematics and Combinatorics