-PERPENDICULAR WIDE SUBCATEGORIES

Pub Date : 2023-08-22 DOI:10.1017/nmj.2023.16

A. B. Buan, Eric J. Hanson

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引用次数: 2

Abstract

Let

$\Lambda $

be a finite-dimensional algebra. A wide subcategory of

$\mathsf {mod}\Lambda $

is called left finite if the smallest torsion class containing it is functorially finite. In this article, we prove that the wide subcategories of

$\mathsf {mod}\Lambda $

arising from

$\tau $

-tilting reduction are precisely the Serre subcategories of left-finite wide subcategories. As a consequence, we show that the class of such subcategories is closed under further

$\tau $

-tilting reduction. This leads to a natural way to extend the definition of the “

$\tau $

-cluster morphism category” of

$\Lambda $

to arbitrary finite-dimensional algebras. This category was recently constructed by Buan–Marsh in the

$\tau $

-tilting finite case and by Igusa–Todorov in the hereditary case.

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-垂直的宽子类别

设$\Lambda $是一个有限维代数。如果包含$\mathsf {mod}\Lambda $的最小扭转类是功能有限的，则称其为左有限子范畴。本文证明了由$\tau $ -倾斜约简产生的$\mathsf {mod}\Lambda $的宽子范畴正是左有限宽子范畴的Serre子范畴。因此，我们证明在进一步的$\tau $ -倾斜约简下，这些子类别的类是封闭的。这导致了将$\Lambda $的“$\tau $ -簇态射范畴”的定义扩展到任意有限维代数的自然方法。这个类别是最近由Buan-Marsh在$\tau $ -倾斜有限情况下和Igusa-Todorov在遗传情况下构建的。

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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