The \v{C}erny conjecture
Abstract
A word of letters on edges of underlying graph of deterministic finite automaton (DFA) is called synchronizing if sends all states of the automaton to a unique state. J. \v{C}erny discovered in 1964 a sequence of -state complete DFA possessing a minimal synchronizing word of length . The hypothesis, well known today as the \v{C}erny conjecture, claims that it is also precise upper bound on the length of such a word for a complete DFA. The hypothesis was formulated in 1966 by Starke. The problem has motivated great and constantly growing number of investigations and generalizations. To prove the conjecture, we use algebra w on a special class of row monomial matrices (one unit and rest zeros in every row), induced by words in the alphabet of labels on edges. These matrices generate a space with respect to the mentioned operation. The proof is based on connection between length of words and dimension of the space generated by solutions of matrix equation for synchronizing word , as well as on the relation between ranks of and .
Keywords
Cite
@article{arxiv.1202.4626,
title = {The \v{C}erny conjecture},
author = {A. N. Trahtman},
journal= {arXiv preprint arXiv:1202.4626},
year = {2022}
}
Comments
14 pages, 11 Lemmas, most of which are considered trivial by various reviewers. Everything goes to that the main result is also trivial. And the author himself is inclined to admit it