DEGREE OF SATISFIABILITY IN HEYTING ALGEBRAS

The Journal of Symbolic Logic Pub Date : 2024-01-09 DOI:10.1017/jsl.2024.2

BENJAMIN MERLIN BUMPUS, ZOLTAN A. KOCSIS

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Abstract

We investigate degree of satisfiability questions in the context of Heyting algebras and intuitionistic logic. We classify all equations in one free variable with respect to finite satisfiability gap, and determine which common principles of classical logic in multiple free variables have finite satisfiability gap. In particular we prove that, in a finite non-Boolean Heyting algebra, the probability that a randomly chosen element satisfies Abstract Image $x \vee \neg x = \top $ is no larger than $\frac {2}{3}$. Finally, we generalize our results to infinite Heyting algebras, and present their applications to point-set topology, black-box algebras, and the philosophy of logic.

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黑汀代数的可满足度

我们以海廷代数和直觉逻辑为背景，研究可满足程度问题。我们根据有限可满足性差距对一个自由变量中的所有方程进行了分类，并确定了在多个自由变量中哪些经典逻辑的普通原理具有有限可满足性差距。我们特别证明，在有限非布尔海廷代数中，随机选择的元素满足 $x \vee \neg x = \top $ 的概率不大于 $\frac {2}{3}$。最后，我们将我们的结果推广到无限海丁代数，并介绍了它们在点集拓扑学、黑盒子代数和逻辑哲学中的应用。

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The Journal of Symbolic Logic

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