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关于斜格的陪集结构

On The Coset Structure Of Skew Lattices
课程网址: http://videolectures.net/solomon_pita_costa_boolean_algebras/  
主讲教师: João Pita Costa
开课单位: 约瑟夫·斯特凡学院
开课时间: 2012-11-12
课程语种: 英语
中文简介:
非交换晶格的研究始于1949年,当时Pascual Jordan受到量子逻辑问题的启发。偏斜晶格是非可交换晶格最成功的变体。乔纳森·里奇(Jonathan Leech)研究了这些代数的更一般形式,后来对它们的布尔形式(称为斜布尔布尔代数)感兴趣。该案例的左手版本包括W.D. Cornish先前研究的布尔偏斜代数类。 R.J. Bignall遵循Keimal和Werner的观点,观察到一个偏布尔布尔代数的子类构成了一个可判别的判别式。与J. Leech,R.Veroff,R.J。 Bignall和M. Spinks研究了这些代数的一般性质,并将其用于多值逻辑的研究。始终特别注意环中的偏斜晶格,它们构成了很多示例,其中Karin Cvetko Vah和JPC回答了几个未解决的问题。如今,像斯通(Stone)和普里斯特利(Priestley)这样的经典对偶成为了这种背景下的研究重点,并且已经取得了一些相关的成果。
课程简介: The study of noncommutative lattices began in 1949 with Pascual Jordan, motivated by questions on Quantum Logic. Skew lattices have been the most successful variation of noncommutative lattices. Jonathan Leech studied a more general version of these algebras and was later interested in their Boolean version termed skew Boolean algebras. The left-handed version of that case includes the class of Boolean skew algebras earlier studied by W.D. Cornish. R.J. Bignall, following ideas of Keimal and Werner, observed a subclass of skew Boolean algebras constitutes a decidable discriminator variety. In collaboration with J. Leech, R. Veroff, R.J. Bignall and M. Spinks have studied general properties of these algebras and used them in the study of multiple valued logic. A special attention has been always devoted to skew lattices in rings, that constitute a large class of examples, where Karin Cvetko-Vah and JPC answered several open questions. Today the classical dualities as Stone’s and Priestley’s are a focus of research in this context, where several relevant results have been achieved.
关 键 词: 非交换晶格; 量子逻辑; 偏斜晶格
课程来源: 视频讲座网
最后编审: 2020-07-24:yumf
阅读次数: 65

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