论文信息 - The Černý Conjecture for Aperiodic Automata

The Černý Conjecture for Aperiodic Automata

A word w is called a synchronizing (recurrent, reset, directable) word of a deterministic finite automaton (DFA) if w brings all states of the automaton to some specific state; a DFA that has a synchronizing word is said to be synchronizable. Černý conjectured in 1964 that every n-state synchronizable DFA possesses a synchronizing word of length at most (n−1). We consider automata with aperiodic transition monoid (such automata are called aperiodic). We show that every synchronizable n-state aperiodic DFA has a synchronizing word of length at most n(n − 1)/2. Thus, for aperiodic automata as well as for automata accepting only star-free languages, the Černý conjecture holds true.

Avraham Trakhtman | A. Trakhtman

[1] P. FRANKL,et al. An Extremal Problem for two Families of Sets , 1982, Eur. J. Comb..

[2] Jarkko Kari,et al. Synchronizing Finite Automata on Eulerian Digraphs , 2003, MFCS.

[3] I. K. Rystsov,et al. Almost optimal bound of recurrent word length for regular automata , 1995 .

[4] David Eppstein,et al. Reset Sequences for Monotonic Automata , 1990, SIAM J. Comput..

[5] Arto Salomaa,et al. Generation of Constants and Synchronization of Finite Automata , 2002, J. Univers. Comput. Sci..

[6] Mikhail V. Volkov,et al. SOME RESULTS ON ČERNÝ TYPE PROBLEMS FOR TRANSFORMATION SEMIGROUPS , 2004 .

[7] Jean-Éric Pin,et al. Sur un Cas Particulier de la Conjecture de Cerny , 1978, ICALP.

[8] Marcel Paul Schützenberger,et al. On Finite Monoids Having Only Trivial Subgroups , 1965, Inf. Control..

[9] L. Dubuc,et al. Sur Les Automates Circulaires et la Conjecture de Cerný , 1998, RAIRO Theor. Informatics Appl..

[10] I. K. Rystsov,et al. Reset Words for Commutative and Solvable Automata , 1997, Theor. Comput. Sci..

[11] J. Pin. On two Combinatorial Problems Arising from Automata Theory , 1983 .