Rough Sets and 3-Valued Logics

被引：0

作者：

A. Avron

B. Konikowska

机构：

[1] Tel-Aviv University,School of Computer Science

[2] Polish Academy of Sciences,Institute of Computer Science

来源：

Studia Logica | 2008年 / 90卷 / 1期

关键词：

rough sets; three-valued logics; non-deterministic matrices; sequent calculi;

D O I：

10.1007/s11225-008-9144-3

中图分类号：

学科分类号：

摘要：

In the paper we explore the idea of describing Pawlak’s rough sets using three-valued logic, whereby the value t corresponds to the positive region of a set, the value f — to the negative region, and the undefined value u — to the border of the set. Due to the properties of the above regions in rough set theory, the semantics of the logic is described using a non-deterministic matrix (Nmatrix). With the strong semantics, where only the value t is treated as designated, the above logic is a “common denominator” for Kleene and Łukasiewicz 3-valued logics, which represent its two different “determinizations”. In turn, the weak semantics—where both t and u are treated as designated—represents such a “common denominator” for two major 3-valued paraconsistent logics.

引用

页码：69 / 92

页数：23

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