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引用次数: 2

摘要

约束满足和启发式搜索的最新进展使得求解经典规划问题的速度大大提高。有越来越多的工作将这些进展扩展到解决包含度量时间、量词和资源数量的更具表现力的计划问题。人们可以将经典规划者大致分为两类:(i)进行优化搜索的规划者和(ii)迭代处理有限大小的表示的规划者,如SAT编码或规划图或约束满足问题(CSP)。在规划人员将规划作为SAT或CSP的发展中,一个关键的挑战是确定当且仅当有k个步骤的计划时满足的约束。对于处理度量时间和/或资源数量和/或量词的计划人员来说,这项任务甚至更加复杂。在本文中,我们展示了如何将这种SAT编码合成用于时间规划。这种编码包含20种约束。我们将展示如何简化这种编码。我们确定的约束集使开发时间规划器更容易将规划作为约束满足问题而不是SAT,如整数线性规划(ILP)。SAT编码可以很容易地适应更复杂的时间规划情况,例如,在执行过程中的不同时间,一个动作的不同前提条件和效果可能为真。我们还讨论了另外两种时间规划的SAT编码。该编码方案使得利用SAT和CSP求解的进展来求解时序规划问题变得更加容易。
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On temporal planning as CSP
Recent advances in constraint satisfaction and heuristic search have made it possible to solve classical planning problems significantly faster. There is an increasing amount of work on extending these advances to solving more expressive planning problems which contain metric time, quantifiers and resource quantities. One can broadly classify classical planners into two categories: (i) planners doing refinement search and (ii) planners iteratively processing a representation of finite size like a SAT encoding or planning graph or a constraint satisfaction problem (CSP). One key challenge in the development of planners casting planning as SAT or CSP is the identification of constraints which are satisfied if and only if there is a plan of k steps. This task is even more complex for planners handling metric time and/or resource quantities and/or quantifiers. In this paper we show how such a SAT encoding can be synthesized for temporal planning. This encoding contains twenty kinds of constraints. We show how this encoding can be simplified. The set of constraints we identify makes it easier to develop temporal planners casting planning as a constraint satisfaction problem other than SAT, like integer linear programming (ILP). The SAT encoding can be easily adapted to more complex cases of temporal planning such as that in which different preconditions and effects of an action may be true at different times during its execution. We also discuss two additional SAT encodings of temporal planning. The encoding schemes make it easier to exploit progress in SAT and CSP solving to solve temporal planning problems.
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