Some applications of $\tau $-tilting theory

TL;DR

This paper explores $ au$-tilting theory for finite dimensional algebras, proving key properties of complements, connectedness of support $ au$-tilting quivers, and verifying a conjecture for specific quiver types.

Contribution

It establishes the equivalence of Bongartz $ au$-tilting and classical complements, proves connectedness of support $ au$-tilting quivers for path algebras, and confirms a conjecture for certain quiver classes.

Findings

Bongartz $ au$-tilting complement coincides with Bongartz complement.

Support $ au$-tilting quiver of path algebra is connected.

Conjecture holds for Dynkin, Euclidean, and certain wild quivers with up to three vertices.

Abstract

Let $A$ be a finite dimensional algebra over an algebraically closed field $k$, and $M$ be a partial tilting $A$-module. We prove that the Bongartz $\tau$-tilting complement of $M$ coincides with its Bongartz complement, and then we give a new proof of that every almost complete tilting $A$-module has at most two complements. Let $A=kQ$ be a path algebra. We prove that the support $\tau$-tilting quiver $\overrightarrow{Q}({\rm s}\tau$-${\rm tilt} A)$ of $A$ is connected. As an application, we investigate the conjecture of Happel and Unger in [9] which claims that each connected component of the tilting quiver $\overrightarrow{Q}({\rm tilt} A)$ contains only finitely many non-saturated vertices. We prove that this conjecture is true for $Q$ being all Dynkin and Euclidean quivers and wild quivers with two or three vertices, and we also give an example to indicates that this conjecture is not true if $Q$ is a wild quiver with four vertices.