Universal extensions of specialization semilattices

IF 0.6 Q3 MATHEMATICS
P. Lipparini
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引用次数: 2

Abstract

. A specialization semilattice is a join semilattice together with a coarser preorder ⊑ satisfying an appropriate compatibility condition. If X is a topological space, then ( P ( X ) , ∪ , ⊑ ) is a specialization semilattice, where x ⊑ y if x ⊆ Ky , for x, y ⊆ X , and K is closure. Specialization semilattices and posets appear as auxiliary structures in many disparate scientific fields, even unrelated to topology. For short, the notion is useful since it allows us to consider a relation of “being generated by” with no need to require the existence of an actual “closure” or “ hull”, which is problematic in certain contexts. In a former work we showed that every specialization semilattice can be embedded into the specialization semilattice associated to a topological space as above. Here we describe the universal embedding of a specialization semilattice into an additive closure semilattice. We notice that a categorical argument guarantees the existence of universal embeddings in many parallel situations.
专门化半格的普遍扩展
特化半格是与满足适当相容条件的较粗预序⊑一起的连接半格。如果X是拓扑空间,则(P(X),Ş,⊑)是一个特化半格,其中,如果X⊆Ky,对于X,y𕥄X,并且K是闭包。专业化半格和偏序集在许多不同的科学领域中作为辅助结构出现,甚至与拓扑无关。简言之,这个概念是有用的,因为它允许我们考虑“由产生”的关系,而不需要要求存在实际的“闭包”或“外壳”,这在某些情况下是有问题的。在以前的工作中,我们证明了每个特化半格都可以嵌入到与拓扑空间相关的特化半晶格中。这里我们描述了一个特化半格到加性闭包半格的泛嵌入。我们注意到,范畴论证保证了在许多平行情况下普遍嵌入的存在。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
1.40
自引率
11.10%
发文量
8
审稿时长
8 weeks
期刊介绍: Categories and General Algebraic Structures with Applications is an international journal published by Shahid Beheshti University, Tehran, Iran, free of page charges. It publishes original high quality research papers and invited research and survey articles mainly in two subjects: Categories (algebraic, topological, and applications in mathematics and computer sciences) and General Algebraic Structures (not necessarily classical algebraic structures, but universal algebras such as algebras in categories, semigroups, their actions, automata, ordered algebraic structures, lattices (of any kind), quasigroups, hyper universal algebras, and their applications.
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