In computer science and automata theory, a Weak Büchi automaton is a formalism which represents a set of infinite words. A Weak Büchi automaton is a modification of Büchi automaton such that for all pair of states and belonging to the same strongly connected component, is accepting if and only if is accepting.
A Büchi automaton accepts a word if there exists a run, such that at least one state occurring infinitely often in the final state set . For Weak Büchi automata, this condition is equivalent to the existence of a run which ultimately stays in the set of accepting states.
Weak Büchi automata are strictly less-expressive than Büchi automata and than Co-Büchi automata.
Properties
editThe deterministic Weak Büchi automata can be minimized in time .[1]
The languages accepted by Weak Büchi automata are closed under union and intersection but not under complementation. For example, can be recognised by a Weak Büchi automaton but its complement cannot.
Non-deterministic Weak Büchi automata are more expressive than Weak Büchi automata. As an example, the language can be decided by a Weak Büchi automaton but by no deterministic Büchi automaton.
References
edit- ^ Löding, Christof (2001). "Efficient Minimization of Deterministic Weak ω-Automata". Information Processing Letters. 79 (3): 105–109. doi:10.1016/S0020-0190(00)00183-6.
- Boigelot, Bernard (3 July 2005). "An effective decision procedure for linear arithmetic over the integers and reals" (PDF). ACM Transactions on Computational Logic. 6 (3): 614–633. doi:10.1145/1071596.1071601.