Torsion classes and t-structures in higher homological algebra

TL;DR

This paper extends the concepts of torsion classes and t-structures to higher homological algebra, specifically in $n$-abelian and $(n+2)$-angulated categories, providing new characterizations and bijections related to $n$-representation finite algebras.

Contribution

It introduces torsion classes and t-structures into higher homological algebra, establishing their properties and relationships in $n$-abelian and $(n+2)$-angulated categories.

Findings

Characterization of torsion classes via higher extension closure

Bijection between torsion classes and intermediate t-structures

Connection to $n$-homological tilting theory

Abstract

Higher homological algebra was introduced by Iyama. It is also known as $n$-homological algebra where $n \geq 2$ is a fixed integer, and it deals with $n$-cluster tilting subcategories of abelian categories. All short exact sequences in such a subcategory are split, but it has nice exact sequences with $n+2$ objects. This was recently formalised by Jasso in the theory of $n$-abelian categories. There is also a derived version of $n$-homological algebra, formalised by Geiss, Keller, and Oppermann in the theory of $( n+2 )$-angulated categories (the reason for the shift from $n$ to $n+2$ is that angulated categories have triangulated categories as the "base case"). We introduce torsion classes and t-structures into the theory of $n$-abelian and $( n+2 )$-angulated categories, and prove several results to motivate the definitions. Most of the results concern the $n$-abelian and $( n+2 )$-angulated categories ${\mathcal M}( \Lambda )$ and ${\mathcal C}( \Lambda )$ associated to an $n$-representation finite algebra $\Lambda$, as defined by Iyama and Oppermann. We characterise torsion classes in these categories in terms of closure under higher extensions, and give a bijection between torsion classes in ${\mathcal M}( \Lambda )$ and intermediate t-structures in ${\mathcal C}( \Lambda )$ which is a category one can reasonably view as the $n$-derived category of ${\mathcal M}( \Lambda )$. We hint at the link to $n$-homological tilting theory.