We show that, for any stochastic event p of period n, there exists a measure-once one-way quantum finite automaton (1qfa) with at most 2√6n + 25 states inducing the event ap + b, for constants a > 0, b ≥ 0, satisfying a + b ≤ 1. This fact is proved by designing an algorithm which constructs the desired 1qfa in polynomial time. As a consequence, we get that any periodic language of period n can be accepted with isolated cut point by a 1qfa with no more than 2√6n + 26 states. Our results give added evidence of the strength of measure-once 1qfa's with respect to classical automata.
On the size of one-way quantum finite automata with periodic behaviors / C. Mereghetti, B.S. Palano. - In: RAIRO. INFORMATIQUE THEORIQUE ET APPLICATIONS. - ISSN 0988-3754. - 36:3(2002), pp. 277-291. ((Intervento presentato al 7. convegno Italian Conference on Theoretical Computer Science tenutosi a Torino nel 2001.
On the size of one-way quantum finite automata with periodic behaviors
C. MereghettiPrimo
;B.S. PalanoUltimo
2002
Abstract
We show that, for any stochastic event p of period n, there exists a measure-once one-way quantum finite automaton (1qfa) with at most 2√6n + 25 states inducing the event ap + b, for constants a > 0, b ≥ 0, satisfying a + b ≤ 1. This fact is proved by designing an algorithm which constructs the desired 1qfa in polynomial time. As a consequence, we get that any periodic language of period n can be accepted with isolated cut point by a 1qfa with no more than 2√6n + 26 states. Our results give added evidence of the strength of measure-once 1qfa's with respect to classical automata.File | Dimensione | Formato | |
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