On Minimality and Size Reduction of One-Tape and Multitape Finite Automata

In this thesis, we consider minimality and size reduction issues of one-tape and multitape automata. Although the topic of minimization of one-tape automata has been widely studied for many years, it seems that some issues have not gained attention. One of these issues concerns finding specific conditions on automata that imply their minimality in the class of nondeterministic finite automata (NFA) accepting the same language. Using the theory of NFA minimization developed by Kameda and Weiner in 1970, we show that any bideterministic automaton (that is, a deterministic automaton with its reversal also being deterministic) is a unique minimal automaton among all NFA accepting its language. In addition to the minimality in regard to the number of states, we also show its minimality in the number of transitions. Using the same theory of Kameda and Weiner, we also obtain a more general minimality result. We specify a set of sufficient conditions under which a minimal deterministic automaton (DFA) accepting some language or the reversal of the minimal DFA of the reversal language is a minimal NFA of the language. We also consider multitape bideterministic automata and show by a counterexample that such automata are not necessarily minimal. However, given a set of accepting computations of a bideterministic multitape automaton, we show that this automaton is a unique minimal automaton with this set of accepting computations.