The maximum length of shortest accepted strings for direction-determinate two-way finite automata
Abstract
It is shown that, for every n ≥slant 2, the maximum length of the shortest string accepted by an n-state direction-determinate two-way finite automaton is exactly nn2-1 (direction-determinate automata are those that always remember in the current state whether the last move was to the left or to the right). For two-way finite automata of the general form, a family of n-state automata with shortest accepted strings of length 34 · 2n - 1 is constructed.
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