Inferring Symbolic Automata

Log. Methods Comput. Sci. Pub Date : 2020-11-10 DOI:10.4230/LIPIcs.CSL.2022.21

D. Fisman, Hadar Frenkel, Sandra Zilles

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引用次数: 4

Abstract

We study the learnability of symbolic finite state automata (SFA), a model shown useful in many applications in software verification. The state-of-the-art literature on this topic follows the query learning paradigm, and so far all obtained results are positive. We provide a necessary condition for efficient learnability of SFAs in this paradigm, from which we obtain the first negative result. The main focus of our work lies in the learnability of SFAs under the paradigm of identification in the limit using polynomial time and data, and its strengthening efficient identifiability, which are concerned with the existence of a systematic set of characteristic samples from which a learner can correctly infer the target language. We provide a necessary condition for identification of SFAs in the limit using polynomial time and data, and a sufficient condition for efficient learnability of SFAs. From these conditions we derive a positive and a negative result. The performance of a learning algorithm is typically bounded as a function of the size of the representation of the target language. Since SFAs, in general, do not have a canonical form, and there are trade-offs between the complexity of the predicates on the transitions and the number of transitions, we start by defining size measures for SFAs. We revisit the complexity of procedures on SFAs and analyze them according to these measures, paying attention to the special forms of SFAs: normalized SFAs and neat SFAs, as well as to SFAs over a monotonic effective Boolean algebra. This is an extended version of the paper with the same title published in CSL'22.

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推理符号自动机

我们研究了符号有限状态自动机(SFA)的可学习性，这个模型在软件验证中有很多应用。关于该主题的最新文献遵循查询学习范式，到目前为止所获得的结果都是积极的。在此范例中，我们提供了sfa有效可学习性的必要条件，并由此得到了第一个否定结果。本文研究的重点是在多项式时间和数据的极限识别范式下，sfa的可学习性及其有效可识别性的增强，这涉及到学习者可以从中正确推断目标语言的一组系统的特征样本的存在。我们提供了在多项式时间和数据的极限下识别sfa的必要条件，以及sfa有效可学习性的充分条件。从这些条件中我们推导出一个正的结果和一个负的结果。学习算法的性能通常是目标语言表示大小的函数。由于sfa通常没有规范的形式，并且在转换上谓词的复杂性和转换的数量之间存在权衡，因此我们从定义sfa的大小度量开始。我们重新审视了sfa过程的复杂性，并根据这些措施对其进行了分析，重点关注了sfa的特殊形式:归一化sfa和整齐sfa，以及单调有效布尔代数上的sfa。这是《CSL’22》发表的同名论文的扩展版。

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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Log. Methods Comput. Sci.

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