Bruhat inversions in Weyl groups and torsion-free classes over preprojective algebras

Abstract

For an element w of the simply-laced Weyl group, Buan-Iyama-Reiten-Scott defined a subcategory F(w) of a module category over a preprojective algebra of Dynkin type. This paper aims at studying categorical properties of F(w) via its connection with the root system. We show that by taking dimension vectors, simple objects in F(w) bijectively correspond to Bruhat inversion roots of w. As an application, we obtain a combinatorial criterion for F(w) to satisfy the Jordan-H\"older property (JHP). To achieve this, we develop a method to find simple objects in a general torsion-free class by using a brick sequence associated to a maximal green sequence of it. For type A case, we give a diagrammatic construction of simple objects, and show that (JHP) can be characterized via a forest-like permutation, introduced by Bousquet-M\'elou and Butler in the study of Schubert varieties.