Finite determinization of fuzzy automata using a parametric product-based t-norm

IF 3.2 1区数学 Q2 COMPUTER SCIENCE, THEORY & METHODS

Fuzzy Sets and Systems Pub Date : 2024-04-26 DOI:10.1016/j.fss.2024.108990

Ivana Micić , Stefan Stanimirović , José Ramón González de Mendívil , Miroslav Ćirić , Zorana Jančić

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Abstract

This paper presents a novel approach for the approximate determinization of fuzzy automata over the product structure. We introduce the parametric modification of the product t-norm in the pre-determinization setting. On the one hand, the behavior of a fuzzy automaton over the parametric t-norm differs from the behavior of the fuzzy automaton over the product t-norm only in words with a degree of acceptance below the given parameter. However, using the parametric t-norm, we obtain an algorithm that outputs a finite minimal deterministic fuzzy automaton whose behavior differs from the starting fuzzy automaton described above. By setting the parameter to a sufficiently small value, the proposed algorithm provides a deterministic fuzzy automaton with behavior that differs insignificantly from the starting fuzzy automaton, as the difference is achieved only for words accepted by the starting fuzzy automaton with an insignificant value. As a tradeoff, the proposed approach provides finite determinization, even when all other determinization methods would result in an infinite deterministic automaton. We support this fact with an illustrative example.

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使用基于参数乘积的 t 准则对模糊自动机进行有限确定

本文提出了一种对积结构模糊自动机进行近似确定的新方法。我们在预判定设置中引入了乘积 t-norm 的参数修正。一方面，参数 t-norm 上的模糊自动机的行为与积 t-norm 上的模糊自动机的行为只有在接受度低于给定参数的情况下才有所不同。然而，使用参数 t 准则，我们可以得到一种算法，它可以输出一个有限最小确定性模糊自动机，其行为与上述起始模糊自动机不同。通过将参数设置为足够小的值，所提出的算法可以提供一个行为与起始模糊自动机差别不大的确定性模糊自动机，因为只有在起始模糊自动机接受的词的值很小时，才会产生差别。作为一种权衡，建议的方法提供了有限确定性，即使所有其他确定性方法都会产生无限确定性自动机。我们通过一个示例来证明这一事实。

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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来源期刊

Fuzzy Sets and Systems 数学-计算机：理论方法

CiteScore

6.50

自引率

17.90%

发文量

321

审稿时长

6.1 months

期刊介绍： Since its launching in 1978, the journal Fuzzy Sets and Systems has been devoted to the international advancement of the theory and application of fuzzy sets and systems. The theory of fuzzy sets now encompasses a well organized corpus of basic notions including (and not restricted to) aggregation operations, a generalized theory of relations, specific measures of information content, a calculus of fuzzy numbers. Fuzzy sets are also the cornerstone of a non-additive uncertainty theory, namely possibility theory, and of a versatile tool for both linguistic and numerical modeling: fuzzy rule-based systems. Numerous works now combine fuzzy concepts with other scientific disciplines as well as modern technologies. In mathematics fuzzy sets have triggered new research topics in connection with category theory, topology, algebra, analysis. Fuzzy sets are also part of a recent trend in the study of generalized measures and integrals, and are combined with statistical methods. Furthermore, fuzzy sets have strong logical underpinnings in the tradition of many-valued logics.