Algorithms for computing the greatest simulations and bisimulations between fuzzy automata
Autor: | Ćirić, Miroslav, Ignjatović, Jelena, Jančić, Ivana, Damljanović, Nada |
---|---|
Rok vydání: | 2011 |
Předmět: | |
Zdroj: | Fuzzy Sets and Systems 208 (2012) 22-42 |
Druh dokumentu: | Working Paper |
DOI: | 10.1016/j.fss.2012.05.006 |
Popis: | Recently, two types of simulations (forward and backward simulations) and four types of bisimulations (forward, backward, forward-backward, and backward-forward bisimulations) between fuzzy automata have been introduced. If there is at least one simulation/bisimulation of some of these types between the given fuzzy automata, it has been proved that there is the greatest simulation/bisimulation of this kind. In the present paper, for any of the above-mentioned types of simulations/bisimulations we provide an effective algorithm for deciding whether there is a simulation/bisimulation of this type between the given fuzzy automata, and for computing the greatest one, whenever it exists. The algorithms are based on the method developed in [J. Ignjatovi\'c, M. \'Ciri\'c, S. Bogdanovi\'c, On the greatest solutions to certain systems of fuzzy relation inequalities and equations, Fuzzy Sets and Systems 161 (2010) 3081-3113], which comes down to the computing of the greatest post-fixed point, contained in a given fuzzy relation, of an isotone function on the lattice of fuzzy relations. Comment: 19 pages, submitted to a journal |
Databáze: | arXiv |
Externí odkaz: |