Probabilistic propositional temporal logics

Q4 Mathematics 信息与控制 Pub Date : 1986-08-01 DOI:10.1016/S0019-9958(86)80001-8

Sergiu Hart, Micha Sharir

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引用次数: 49

Abstract

We present two (closely-related) propositional probabilistic temporal logics based on temporal logics of branching time as introduced by Ben-Ari, Pnueli, and Manna (Acta Inform. 20 (1983), 207–226), Emerson and Halpern (“Proceedings, 14th ACM Sympos. Theory of Comput.,” 1982, pp. 169–179, and Emerson and Clarke (Sci. Comput. Program. 2 (1982), 241–266). The first logic, PTL_f, is interpreted over finite models, while the second logic, PTL_b, which is an extension of the first one, is interpreted over infinite models with transition probabilities bounded away from 0. The logic PTL_f allows us to reason about finite-state sequential probabilistic programs, and the logic PTL_b allows us to reason about (finite-state) concurrent probabilistic programs, without any explicit reference to the actual values of their state-transition probabilities. A generalization of the tableau method yields deterministic single-exponential time decision procedures for our logics, and complete axiomatizations of them are given. Several meta-results, including the absence of a finite-model property for PTL_b, and the connection between satisfiable formulae of PTL_b and finite state concurrent probabilistic programs, are also discussed.

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概率命题时间逻辑

我们提出了两个(密切相关的)基于分支时间时间逻辑的命题概率时间逻辑，这是由Ben-Ari, Pnueli和Manna (Acta Inform. 20 (1983)， 207-226)， Emerson和Halpern(“Proceedings，第14届ACM研讨会”)介绍的。《计算机理论》， 1982年，第169-179页，爱默生和克拉克(Sci。第一版。程序2(1982)，241-266)。第一个逻辑，PTLf，是在有限模型上解释的，而第二个逻辑，PTLb，是第一个逻辑的扩展，是在无限模型上解释的，转移概率有界远离0。逻辑PTLf允许我们对有限状态顺序概率程序进行推理，逻辑PTLb允许我们对(有限状态)并发概率程序进行推理，而无需显式引用其状态转移概率的实际值。对表法的推广，给出了确定的单指数时间决策过程，并给出了它们的完全公理化。讨论了PTLb的有限模型性质的不存在性，以及PTLb的可满足公式与有限状态并发概率规划之间的联系。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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