On (naturally) semifull and (semi)separable semifunctors

IF 0.5 3区数学 Q3 MATHEMATICS

Journal of Algebra and Its Applications Pub Date : 2024-03-20 DOI:10.1142/s0219498825502111

Lucrezia Bottegoni

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引用次数: 0

Abstract

The notion of semifunctor between categories, due to [9], is defined as a functor that does not necessarily preserve identities. In this paper, we study how several properties of functors, such as fullness, full faithfulness, separability, natural fullness, can be formulated for semifunctors. Since a full semifunctor is actually a functor, we are led to introduce a notion of semifullness (and then semifull faithfulness) for semifunctors. In order to show that these conditions can be derived from requirements on the hom-set components associated with a semifunctor, we look at “semisplitting properties” for seminatural tranformations and we investigate the corresponding properties for morphisms whose source or target is the image of a semifunctor. We define the notion of naturally semifull semifunctor and we characterize natural semifullness for semifunctors that are part of a semiadjunction in terms of semisplitting conditions for the unit and counit attached to the semiadjunction. We study the behavior of semifunctors with respect to (semi)separability and we prove Rafael-type Theorems for (semi)separable semifunctors and a Maschke-type theorem for separable semifunctors. We provide examples of semifunctors on which we test the properties considered so far.

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关于（自然）半满和（半）可分离半函数

范畴之间的半矢量概念源于[9]，它被定义为不一定保留同一性的函数。在本文中，我们将研究如何为半函数制定函数的几个性质，如完全性、完全忠实性、可分性、自然完全性。由于全半函数实际上是一个函子，因此我们要为半函数引入一个半充分性（进而半充分忠实性）的概念。为了证明这些条件可以从对与半矢量相关的同集成分的要求中推导出来，我们研究了半自然变换的 "半分割性质"，并探讨了源或目标为半矢量映像的态的相应性质。我们定义了自然半满半矢量的概念，并根据半矢量的单位和反位的半拆分条件，描述了作为半连接的一部分的半矢量的自然半满性。我们研究了半函数在（半）可分性方面的行为，并证明了（半）可分性半函数的拉斐尔型定理和可分性半函数的马斯克型定理。我们提供了一些半函数的例子，在这些例子上我们检验了迄今为止所考虑的性质。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Algebra and Its Applications 数学-数学

CiteScore

1.50

自引率

12.50%

发文量

226

审稿时长

4-8 weeks

期刊介绍： The Journal of Algebra and Its Applications will publish papers both on theoretical and on applied aspects of Algebra. There is special interest in papers that point out innovative links between areas of Algebra and fields of application. As the field of Algebra continues to experience tremendous growth and diversification, we intend to provide the mathematical community with a central source for information on both the theoretical and the applied aspects of the discipline. While the journal will be primarily devoted to the publication of original research, extraordinary expository articles that encourage communication between algebraists and experts on areas of application as well as those presenting the state of the art on a given algebraic sub-discipline will be considered.