Exponentially more concise quantum recognition of non-RMM regular languages
作者:
Highlights:
• We introduce one-way quantum finite automata together with classical states (1QFAC).
• We prove that 1QFAC are at most exponentially more concise than DFA.
• We give a polynomial-time algorithm for determining the equivalence of 1QFAC.
• We show that the state minimization of 1QFAC is decidable within EXPSPACE.
摘要
•We introduce one-way quantum finite automata together with classical states (1QFAC).•We prove that 1QFAC are at most exponentially more concise than DFA.•We give a polynomial-time algorithm for determining the equivalence of 1QFAC.•We show that the state minimization of 1QFAC is decidable within EXPSPACE.
论文关键词:Quantum finite automata,Equivalence,Regular languages,Deterministic finite automata,Decidability,State complexity
论文评审过程:Received 2 June 2012, Accepted 4 June 2014, Available online 27 June 2014.
论文官网地址:https://doi.org/10.1016/j.jcss.2014.06.008
