We report on progress relating K-valued FCA to K-Linear Algebra where K. is an idempotent semifield. We first find that the standard machinery of linear algebra points to Galois adjunctions as the preferred construction, which generates either Neighbourhood Lattices of attributes or objects. For the Neighbourhood of objects we provide the adjoints, their respective closure and interior operators and the general structure of the lattices, both of objects and attributes. Next, these results and those previous on Galois connections are set against the backdrop of Extended Formal Concept Analysis. Our results show that for a K-valued formal context (G,M,R)-where |G| = g, |M| = m and R ∈ K~(9×m)-there are only two different "shapes" of lattices each of which comes in four different "colours", suggesting a notion of a 4-concept associated to a formal concept. Finally, we draw some conclusions as to the use of these as data exploration constructs, allowing many different "readings" on the contextualized data.
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机译:我们报告了将K值FCA与K线性代数相关的进展,其中K.是幂等半场。我们首先发现线性代数的标准机制将加洛瓦(Galois)附加词作为首选构造,它会生成属性或对象的邻域格。对于对象的邻域,我们提供伴随物,它们各自的闭合和内部运算符以及对象和属性的格的一般结构。接下来,在扩展形式概念分析的背景下设置这些结果以及先前在Galois上获得的结果。我们的结果表明,对于K值形式上下文(G,M,R),其中| G | = g,| M | = m和R∈K〜(9×m)-仅有两种不同的格子“形状”,每一种都具有四种不同的“颜色”,这暗示了与形式概念相关的4概念的概念。最后,我们得出关于将其用作数据探索结构的一些结论,从而允许对上下文化数据进行许多不同的“阅读”。
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