Two-way cost automata and cost logics over infinite trees

Achim Blumensath, Thomas Colcombet, Denis Kuperberg, P. Parys, M. V. Boom
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引用次数: 13

Abstract

Regular cost functions provide a quantitative extension of regular languages that retains most of their important properties, such as expressive power and decidability, at least over finite and infinite words and over finite trees. Much less is known over infinite trees. We consider cost functions over infinite trees defined by an extension of weak monadic second-order logic with a new fixed-point-like operator. We show this logic to be decidable, improving previously known decidability results for cost logics over infinite trees. The proof relies on an equivalence with a form of automata with counters called quasi-weak cost automata, as well as results about converting two-way alternating cost automata to one-way alternating cost automata.
双向成本自动机和无限树上的成本逻辑
正则代价函数提供了正则语言的定量扩展,保留了它们的大多数重要属性,例如表达能力和可判定性,至少在有限和无限单词以及有限树上是如此。对于无限的树,我们知道的要少得多。考虑无限树上的代价函数,该代价函数是由弱一元二阶逻辑的扩展和一个新的不动点算子定义的。我们证明了这种逻辑是可决定的,改进了以前已知的无限树上成本逻辑的可决定性结果。该证明依赖于具有计数器的自动机形式的等价性,称为准弱代价自动机,以及将双向交替代价自动机转换为单向交替代价自动机的结果。
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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