We study the relationship between the sizes of two-way finite automata accepting a language and its complement. In the deterministic case, for a given automaton (2dfa) with n states, we build an automaton accepting the complement with at most 4n states, independently of the size of the input alphabet. Actually, we show a stronger result, by presenting an equivalent 4n-state 2dfa that always halts. For the nondeterministic case, using a variant of inductive counting, we show that the complement of a unary language, accepted by an n-state two-way automaton (2nfa), can be accepted by an O(n^8)-state 2nfa. Here we also make 2nfa’s halting. This allows the simulation of unary 2nfa’s by probabilistic Las Vegas two-way automata with O(n^8) states.
Complementing two-way finite automata / V. Geffert, C. Mereghetti, G. Pighizzini. - In: INFORMATION AND COMPUTATION. - ISSN 0890-5401. - 205:8(2007 Aug), pp. 1173-1187. (Intervento presentato al 9. convegno International Conference on Developments in Language Theory tenutosi a Palermo nel 2005) [10.1016/j.ic.2007.01.008].
Complementing two-way finite automata
C. Mereghetti
;G. PighizziniUltimo
2007
Abstract
We study the relationship between the sizes of two-way finite automata accepting a language and its complement. In the deterministic case, for a given automaton (2dfa) with n states, we build an automaton accepting the complement with at most 4n states, independently of the size of the input alphabet. Actually, we show a stronger result, by presenting an equivalent 4n-state 2dfa that always halts. For the nondeterministic case, using a variant of inductive counting, we show that the complement of a unary language, accepted by an n-state two-way automaton (2nfa), can be accepted by an O(n^8)-state 2nfa. Here we also make 2nfa’s halting. This allows the simulation of unary 2nfa’s by probabilistic Las Vegas two-way automata with O(n^8) states.File | Dimensione | Formato | |
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