求解集合约束的方程组

[1992] Proceedings of the Seventh Annual IEEE Symposium on Logic in Computer Science Pub Date : 1992-06-22 DOI:10.1109/LICS.1992.185545

A. Aiken, E. Wimmers

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引用次数: 120

摘要

证明了使用所有标准集运算，特别是无限制并补运算的集约束系统是可解的。开发的核心是一种算法，它可以在保留解决方案集的同时增量地转换约束系统。最终，要么系统被证明是不一致的，要么所有的解都可以被展示出来。大部分的工作是证明如果这个算法没有发现不一致，那么系统就有一个解决方案。这是通过展示由算法生成的约束系统可以转换为保证有解的等价方程组来实现的。这些方程本质上是树自动机。

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Solving systems of set constraints

It is shown that systems of set constraints that use all the standard set operations, especially unrestricted union and complement, can be solved. The centerpiece of the development is an algorithm that incrementally transforms a system of constraints while preserving the set of solutions. Eventually, either the system is shown to be inconsistent or all solutions can be exhibited. Most of the work is in proving that if this algorithm does not discover an inconsistency, then the system has a solution. This is done by showing that the system of constraints generated by the algorithm can be transformed into an equivalent set of equations that are guaranteed to have a solution. These equations are essentially tree automata.<>

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[1992] Proceedings of the Seventh Annual IEEE Symposium on Logic in Computer Science

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