A Category-Theoretic Perspective on Higher-Order Approximation Fixpoint Theory (Extended Version)

arXiv - CS - Logic in Computer Science Pub Date : 2024-08-21 DOI:arxiv-2408.11712
Samuele Pollaci, Babis Kostopoulos, Marc Denecker, Bart Bogaerts
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Abstract

Approximation Fixpoint Theory (AFT) is an algebraic framework designed to study the semantics of non-monotonic logics. Despite its success, AFT is not readily applicable to higher-order definitions. To solve such an issue, we devise a formal mathematical framework employing concepts drawn from Category Theory. In particular, we make use of the notion of Cartesian closed category to inductively construct higher-order approximation spaces while preserving the structures necessary for the correct application of AFT. We show that this novel theoretical approach extends standard AFT to a higher-order environment, and generalizes the AFT setting of arXiv:1804.08335 .
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从范畴论角度看高阶逼近定点理论(扩展版)
近似定点理论(AFT)是一个代数框架,旨在研究非单调逻辑的语义。尽管 AFT 取得了成功,但它并不容易适用于高阶定义。为了解决这个问题,我们利用范畴论中的概念建立了一个正式的数学框架。特别是,我们利用笛卡尔封闭范畴的概念来归纳构造高阶近似空间,同时保留了正确应用 AFT 所必需的结构。我们表明,这种新颖的理论方法将标准 AFT 扩展到了高阶环境,并概括了 arXiv:1804.08335 的 AFT 设置。
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arXiv - CS - Logic in Computer Science
arXiv - CS - Logic in Computer Science
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