A non-associative generalization of effect algebras

被引：0

作者：

Ivan Chajda

Helmut Länger

机构：

[1] Palacký University Olomouc,Department of Algebra and Geometry

[2] Vienna University of Technology,Institute of Discrete Mathematics and Geometry

来源：

Soft Computing | 2012年 / 16卷

关键词：

Skew effect algebra; Switching involution; Antitone involution; SSI-poset;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

Effect algebras play an important role in the logic of quantum mechanics. The aim of this paper is to drop the associativity of addition. However, some important properties of effect algebras are preserved, e.g. every so-called skew effect algebra is still a bounded poset with an antitone involution. Moreover, skew effect algebras are fully characterized as certain bounded posets with sectionally switching involutions.

引用

页码：1411 / 1414

页数：3

共 19 条

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[10] Kühr J(undefined)undefined undefined undefined undefined-undefined

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