Modal Logics of Stone Spaces

被引：0

作者：

Guram Bezhanishvili

John Harding

机构：

[1] New Mexico State University,Department of Mathematical Sciences

来源：

Order | 2012年 / 29卷

关键词：

Modal logic; Boolean algebra; Stone space; Metrizable space; Extremally disconnected space; 03B45; 03G05; 06E15; 54E45; 54G05; 03B55;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

Interpreting modal diamond as the closure of a topological space, we axiomatize the modal logic of each metrizable Stone space and of each extremally disconnected Stone space. As a corollary, we obtain that S4.1 is the modal logic of the Pelczynski compactification of the natural numbers and S4.2 is the modal logic of the Gleason cover of the Cantor space. As another corollary, we obtain an axiomatization of the intermediate logic of each metrizable Stone space and of each extremally disconnected Stone space. In particular, we obtain that the intuitionistic logic is the logic of the Pelczynski compactification of the natural numbers and the logic of weak excluded middle is the logic of the Gleason cover of the Cantor space.

引用

页码：271 / 292

页数：21

共 22 条

[11] Bezhanishvili G(1937)The theory of representations for Boolean algebras Fundam. Math. 29 223-302
[12] Morandi PJ(2003)Algebraic characterizations of special Boolean rings Stud. Log. 75 327-344
[13] de Groot J(undefined)Euclidean hierarchy in modal logic undefined undefined undefined-undefined
[14] Hewitt E(undefined)undefined undefined undefined undefined-undefined
[15] McKinsey JCC(undefined)undefined undefined undefined undefined-undefined
[16] Tarski A(undefined)undefined undefined undefined undefined-undefined
[17] Pełczyński A(undefined)undefined undefined undefined undefined-undefined
[18] Stone MH(undefined)undefined undefined undefined undefined-undefined
[19] Stone MH(undefined)undefined undefined undefined undefined-undefined
[20] van Benthem J(undefined)undefined undefined undefined undefined-undefined

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