We study the reachability problem for continuous one-counter automata, COCA for short. In such automata, transitions are guarded by upper and lower bound tests against the counter value. Additionally, the counter updates associated with taking transitions can be (non-deterministically) scaled down by a nonzero factor between zero and one. Our three main results are as follows: (1) We prove that the reachability problem for COCA with global upper and lower bound tests is in NC2; (2) that, in general, the problem is decidable in polynomial time; and (3) that it is decidable in the polynomial hierarchy for COCA with parametric counter updates and bound tests.
翻译:我们研究的是连续单对数自动测试的可达性问题,COCA是短期的。在这种自动数据中,过渡由上下限测试对反值加以保护。此外,与过渡有关的反更新可以(非非决定性地)减少零到1之间的非零系数。我们的三个主要结果如下:(1) 我们证明,全球上下限测试的COCA的可达性问题在第二次国家信息通报中存在;(2) 一般而言,问题可在多元时发生;(3) 在COCA的多元等级中,它具有准反更新和约束测试。
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