Solving fuzzy constraint satisfaction problems with fuzzy GENET

Proceedings Tenth IEEE International Conference on Tools with Artificial Intelligence (Cat. No.98CH36294) Pub Date : 1998-11-10 DOI:10.1109/TAI.1998.744840

Jason H. Y. Wong, Ho-fung Leung

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引用次数: 5

Abstract

Constraint satisfaction is well known to be applicable in modeling AI problems. Despite their extensive literature, the framework is sometimes inflexible and the results are not very satisfactory when applied to real-life problems. With the incorporation of the theory of fuzzy sets, fuzzy constraint satisfaction problems (FCSP's) have been exploited. FCSP's model real-life problems better by allowing both full and partial satisfaction of individual constraints. GENET, which has been shown to be efficient and effective in solving certain traditional CSPs, has been extended to handle FCSPs. Through transforming FCSPs into 0-1 integer programming problems, Wong and Leung (1998) displayed the equivalence between the underlying working mechanism of fuzzy GENET and the discrete Lagrangian method. We focus on the performance of fuzzy GENET in attacking large-scale and real-life over-constrained problems. An efficient simulator of fuzzy GENET for single-processor machines is implemented. Benchmarking results confirm its feasibility, flexibility, and superb efficiency in tackling both CSPs and FCSPs.

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用模糊GENET求解模糊约束满足问题

约束满足是众所周知的适用于建模人工智能问题。尽管他们有大量的文献，但这个框架有时是不灵活的，当应用于实际问题时，结果不是很令人满意。结合模糊集理论，研究了模糊约束满足问题。FCSP通过允许个体约束的完全和部分满足来更好地模拟现实问题。GENET已被证明在解决某些传统的csp方面是高效和有效的，它已被扩展到处理fsp。Wong和Leung(1998)通过将fcsp转化为0-1整数规划问题，展示了模糊GENET的底层工作机制与离散拉格朗日方法的等价性。我们关注模糊GENET在解决大规模和现实生活中的过度约束问题方面的性能。实现了一种高效的单处理机模糊GENET仿真器。基准测试结果证实了其在处理csp和fcsp方面的可行性，灵活性和卓越的效率。

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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Proceedings Tenth IEEE International Conference on Tools with Artificial Intelligence (Cat. No.98CH36294)

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