Distributive PBZ $$^{*}$$ -lattices

IF 0.6 3区 数学 Q2 LOGIC Studia Logica Pub Date : 2024-08-20 DOI:10.1007/s11225-024-10136-y
Claudia Mureşan
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Abstract

Arising in the study of Quantum Logics, PBZ\(^{*}\)-lattices are the paraorthomodular Brouwer–Zadeh lattices in which the pairs of elements with their Kleene complements satisfy the Strong De Morgan condition with respect to the Brouwer complement. They form a variety \(\mathbb {PBZL}^{*}\) which includes that of orthomodular lattices considered with an extended signature (by endowing them with a Brouwer complement coinciding with their Kleene complement), as well as antiortholattices (whose Brouwer complements are trivial). The former turn out to have directly irreducible lattice reducts and, under distributivity, no nontrivial elements with bounded lattice complements, since the elements with bounded lattice complements coincide to the sharp elements in distributive PBZ\(^{*}\)-lattices. The variety \(\mathbb {DIST}\) of distributive PBZ\(^{*}\)-lattices has an infinite ascending chain of subvarieties, and the variety generated by orthomodular lattices and antiortholattices has an infinity of pairwise disjoint infinite ascending chains of subvarieties.

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分布式 PBZ $$^{*}$ 格
PBZ (^{*}\)网格是在量子逻辑学研究中出现的对正模布劳威尔-扎德网格,其中元素对及其克莱因补集满足关于布劳威尔补集的强德摩根条件。它们构成了一个综类 \(\mathbb {PBZL}^{*}/),其中包括以扩展签名考虑的正交网格(通过赋予它们与它们的克莱因补码重合的布劳威尔补码),以及反正交网格(它们的布劳威尔补码是微不足道的)。结果发现前者有直接不可还原的晶格还原,而且在分布性条件下,没有具有有界晶格补集的非琐碎元素,因为具有有界晶格补集的元素与分布性 PBZ\(^{*}\)-lattices 中的尖元素重合。分布式 PBZ(^{*}\)-格的综(\mathbb {DIST}\)有一个无限上升的子域链,而正交格和反正交格生成的综有无数个成对不相交的无限上升的子域链。
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来源期刊
Studia Logica
Studia Logica MATHEMATICS-LOGIC
CiteScore
1.70
自引率
14.30%
发文量
43
审稿时长
6-12 weeks
期刊介绍: The leading idea of Lvov-Warsaw School of Logic, Philosophy and Mathematics was to investigate philosophical problems by means of rigorous methods of mathematics. Evidence of the great success the School experienced is the fact that it has become generally recognized as Polish Style Logic. Today Polish Style Logic is no longer exclusively a Polish speciality. It is represented by numerous logicians, mathematicians and philosophers from research centers all over the world.
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