用区间关系分解格

M. Koyda, Gerd Stumme
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引用次数: 2

摘要

本文研究了有限格的因式分解,在保留剩余有序结构的同时内爆选定的区间。我们研究了如何利用完全同余关系和完全容限关系来实现这一目的,并回答了在生成的因子格中找到最优关系来内爆给定区间的问题。为了克服基于这些关系的分解的局限性,我们引入了一种新的晶格分解,使有限晶格的选定不相交区间内爆。为此,我们提出了一个产生这种分解的区间关系。为了获得格而不是任意有序集,我们将这种方法限制为所谓的纯区间。在我们的研究中,我们将使用形式概念分析(FCA)的方法。我们还将提供一种新的FCA构造,通过引入在形式上下文中由一组区间充实关联关系,来研究在上下文中生成格的区间关系的方法。
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Factorizing Lattices by Interval Relations
This work investigates the factorization of finite lattices to implode selected intervals while preserving the remaining order structure. We examine how complete congruence relations and complete tolerance relations can be utilized for this purpose and answer the question of finding the finest of those relations to implode a given interval in the generated factor lattice. To overcome the limitations of the factorization based on those relations, we introduce a new lattice factorization that enables the imploding of selected disjoint intervals of a finite lattice. To this end, we propose an interval relation that generates this factorization. To obtain lattices rather than arbitrary ordered sets, we restrict this approach to so-called pure intervals. For our study, we will make use of methods from Formal Concept Analysis (FCA). We will also provide a new FCA construction by introducing the enrichment of an incidence relation by a set of intervals in a formal context, to investigate the approach for lattice-generating interval relations on the context side.
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