利用非满射内射映射对任意无限集的划分及一个显著半群的研究

Charif Harrafa
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引用次数: 0

摘要

本文给出了利用非满射内射映射对任意无限集进行分区的一种特别显著的方法。从无限集到自身的非满射单射映射构成了一个符合复合律的半群,并结合了一些性质,使我们能够证明显著元素的存在性。更不用说相容的等价关系,允许将上述定律转移到商集上,商集可以提供晶格结构。最后,我们将提出协注入的概念和它的一些性质。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Partitioning of Any Infinite Set with the Aid of Non-Surjective Injective Maps and the Study of a Remarkable Semigroup
In this article, we will present a particularly remarkable partitioning method of any infinite set with the aid of non-surjective injective maps. The non-surjective injective maps from an infinite set to itself constitute a semigroup for the law of composition bundled with certain properties allowing us to prove the existence of remarkable elements. Not to mention a compatible equivalence relation that allows transferring the said law to the quotient set, which can be provided with a lattice structure. Finally, we will present the concept of Co-injectivity and some of its properties.
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