# Wall-and-chamber structures for finite-dimensional algebras and   $\tau$-tilting theory

**Authors:** Maximilian Kaipel, Hipolito Treffinger

arXiv: 2302.12699 · 2023-02-27

## TL;DR

This paper explores the wall-and-chamber structure as a geometric invariant of finite-dimensional algebras, detailing its connection to torsion classes and $	au$-tilting theory.

## Contribution

It provides a formal definition of the wall-and-chamber structure and clarifies its relationship with torsion classes and $	au$-tilting theory.

## Key findings

- Defines the wall-and-chamber structure for finite-dimensional algebras
- Establishes the relationship between wall-and-chamber structures and torsion classes
- Connects wall-and-chamber structures with $	au$-tilting theory

## Abstract

The wall-and-chamber structure is a geometric invariant that can be associated to any algebra. In this notes we give the definition of this object and we explain its relationship with torsion classes and $\tau$-tilting theory.

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Source: https://tomesphere.com/paper/2302.12699