Exceptional sequences and rooted labeled forests

TL;DR

This paper establishes a bijection between rooted labeled forests and exceptional sequences for type A quivers, connecting combinatorics, representation theory, and braid group actions.

Contribution

It introduces a new representation-theoretic bijection linking rooted forests to exceptional sequences and describes the braid group action on these forests.

Findings

Bijection between rooted forests and exceptional sequences for type A quivers.

Natural action of the extended braid group on rooted forests.

Description of the Garside element's action relating to cluster theory.

Abstract

We give a representation-theoretic bijection between rooted labeled forests with $n$ vertices and complete exceptional sequences for the quiver of type $A_n$ with straight orientation. The ascending and descending vertices in the forest correspond to relatively injective and relatively projective objects in the exceptional sequence. We conclude that every object in an exceptional sequence for linearly oriented $A_n$ is either relatively projective or relatively injective or both. We construct a natural action of the extended braid group on rooted labeled forests and show that it agrees with the known action of the braid group on complete exceptional sequences. We also describe the action of $\Delta$, the Garside element of the braid group, on rooted labeled forests using representation theory and show how this relates to cluster theory.